The EDGE-CALIFA Survey: The Resolved Star Formation Efficiency and Local Physical Conditions

V. Villanueva; A. Bolatto; S. Vogel; R. C. Levy; S. F. Sánchez; J. Barrera-Ballesteros; T. Wong; E. Rosolowsky; D. Colombo; M. Rubio; Y. Cao; V. Kalinova; A. Leroy; D. Utomo; R. Herrera-Camus; L. Blitz; Y. Luo

doi:10.3847/1538-4357/ac2b29

1. Introduction

Star formation is one of the most important evolutionary processes that shape galaxies over cosmic times. Either from the intergalactic medium or through galaxy–galaxy interactions, the accretion of gas into a galaxy potential well provides the fuel for future star formation (e.g., Di Matteo et al. 2007; Bournaud & Elmegreen 2009). The mechanisms behind the conversion of gas into stars have been investigated in both distant and nearby galaxies (Kennicutt & Evans 2012; Madau & Dickinson 2014). The Kennicutt (1989, 1998) seminal studies of the galaxy star formation scaling relations in terms of both the star formation rate (SFR) and neutral gas surface densities (Σ_SFR and Σ_gas, respectively) showed that they are strongly correlated. More recent studies of the scaling laws between gas, stars, and star formation activity show that the latter is most closely related to molecular gas (H₂) and focus on the mechanisms that convert H₂ into stars, as the main gas reservoir for star formation (Wong & Blitz 2002; Kennicutt et al. 2007; Bigiel et al. 2008; Leroy et al. 2008; Bigiel et al. 2011; Leroy et al. 2013).

Stars form in giant molecular clouds (GMCs) in which the molecular gas is the main constituent (e.g., Sanders et al. 1985). We usually trace molecular gas through observations of the low-J transitions of the carbon monoxide (CO) molecule that provide a good measure of the total molecular mass. The ¹²C¹⁶O (J = 1–0) transition has been commonly used as a tracer of H₂ since it is the second most abundant molecule and it can be easily excited in the cold interstellar medium (ISM). The CO (1–0) emission line is usually optically thick, and the conversion of CO luminosity, ${L}_{\mathrm{CO}\ 1-0}^{{\prime} }$ , into molecular gas mass, ${M}_{{{\rm{H}}}_{2}}$ , is done through a CO-to-H₂ conversion factor α_CO (e.g., Bolatto et al. 2013), which appears reasonably constant in the molecular regions of galactic disks but changes at low metallicities and frequently in galaxy centers in response to environmental conditions (e.g., Wolfire et al. 2010; Narayanan et al. 2012).

In the past decades a sharp increase in optical data on galaxies has enabled the detailed study of structure assembly in the universe, with the goal of understanding the mechanisms that drive the universe from the very smooth state imprinted on the cosmic microwave background radiation to the galaxies we observe today. Optical spectroscopic surveys (e.g., zCOSMOS, Lilly et al. 2007; Sloan Digital Sky Survey III, Alam et al. 2015; KMOS^3D, Wisnioski et al. 2015; SINS, Förster Schreiber et al. 2009) have shown the relations between star formation, stellar population, nuclear activity, and metal enrichment for unresolved galaxies in a broad range of redshifts. Meanwhile, gas surveys of nearby galaxies have enabled the exploration of the physics behind the star formation relations (e.g., Leroy et al. 2008, 2013; Saintonge et al. 2011, 2017). These data have revealed that the SFR responds to two main factors: the molecular gas content and the stellar potential of the system. An important piece of information is the internal structure of the galaxies. The new generation of integrated field unit (IFU) spectroscopy surveys (e.g., Calar Alto Legacy Integral Field Area, CALIFA, Sánchez et al. 2012; SAMI, Croom et al. 2012; MaNGA, Bundy et al. 2015) have provided detailed spectral imaging data with unprecedented spectral and spatial coverage and good resolution, giving the opportunity to map metallicities, dynamics, extinctions, SFRs, stellar mass density, and other quantities across galaxies. In addition, imaging spectroscopy of the molecular gas from millimeter-wave interferometers (Bolatto et al. 2017; Lin et al. 2019; Leroy et al. 2021) adds invaluable information to understand the baryon cycle in galaxies in the local universe, where star formation has experienced a drastic decline since the peak of cosmic activity (Madau & Dickinson 2014).

The study of star formation in galaxies demands a holistic approach, since the phenomenon is controlled by multiple processes and it covers a broad range of scales and environments. The analysis of a broad range of galaxy types with multi-wave-band data sets is therefore essential to understand the physical conditions that drive star formation activity. The Extragalactic Database for Galaxy Evolution (EDGE) survey is one of the legacy programs completed by the Combined Array for Millimeter-wave Astronomy (CARMA) interferometer (Bock 2006), spanning imaging observations of CO emission in 126 local galaxies. The combination of the EDGE survey with the IFU spectroscopy from the CALIFA survey (Sánchez et al. 2012) constitutes the EDGE-CALIFA survey (Bolatto et al. 2017), which provides ¹²CO and ¹³CO (J = 1 − 0) images at good sensitivity and angular resolution covering the CALIFA field of view (FOV).

In this work, we investigate the star formation efficiency (SFE_gas, where SFE_gas [yr⁻¹] = Σ_SFR/Σ_gas) in the EDGE-CALIFA survey, taking advantage of its large multiwavelength data for 81 local galaxies with low inclinations. In particular, we investigate how the SFE_gas depends on physical quantities such as galactocentric radius, stellar surface density, midplane gas pressure, orbital timescale, and the stability of the gas disk to collapse. This paper is organized as follows: Section 2 explains the main characteristics of the EDGE-CALIFA survey and the sample selection. In Section 3 we present the methods employed for data analysis, including the CO stacking procedure and the equations we used to derive the basic quantities. Finally, in Section 4 we present our results and discussion, and in Section 5 we present a summary and conclusions of this work.

2. Data Products

2.1. The EDGE and CALIFA Surveys

The EDGE-CALIFA survey (Bolatto et al. 2017) is based on the optical integrated field spectroscopy (IFS) CALIFA and CO EDGE surveys. In the next paragraphs, we briefly summarize the main features of these two data sets.

The Calar Alto Legacy Integral Field Area survey, CALIFA (Sánchez et al. 2012), comprises a sample of approximately 800 galaxies at z ≈ 0. The data were acquired by using the combination of the PMAS/PPAK IFU instrument (Roth et al. 2005) and the 3.5 m telescope from the Calar Alto Observatory. PMAS/PPAK uses 331 fibers each with a diameter of 2 farcs 7 sorted in a hexagonal shape that covers an FOV of ∼1 arcmin². Its average resolution is λ/Δλ ∼ 850 at ∼5000 Å, with a wavelength range that spans from 3745 to 7300 Å. CALIFA galaxies are selected such that their isophotal diameters, D₂₅, match well the PMA/PPAK FOV, and they range from 45'' to 80'' in the Sloan Digital Sky Survey (SDSS) r band (Walcher et al. 2014). The CALIFA survey uses a data reduction pipeline designed to produce data cubes with more than 5000 spectra and with a sampling of 1 × 1 arcsec² per spaxel. For more details, see Sánchez et al. (2012).

The Extragalactic Database for Galaxy Evolution, EDGE, is a large interferometric CO and ¹³CO J = 1 − 0 survey that comprises 126 galaxies selected from the CALIFA survey. The observations were taken using the Combined Array for Millimeter-wave Astronomy (CARMA; Bock 2006) in a combination of the E and D configurations for a total of roughly 4.3 hr per source, with a typical resolution of 8'' and 4'', respectively. The observations used half-beam-spaced seven-point hexagonal mosaics giving a half-power FOV of radius ∼50''. The data are primary gain corrected and masked where the primary beam correction is greater than a factor of 2.5. The final maps, resulting from the combination of E and D array data, have a velocity resolution of 20 km s⁻¹ and typical velocity coverage of 860 km s⁻¹, a typical angular resolution of 4 farcs 5, and an rms sensitivity of 30 mK at the velocity resolution. For more details, see Bolatto et al. (2017).

2.2. `edge`_`pydb` Database

The EDGE-CALIFA survey provides global (integrated) and spatially resolved information about the molecular/ionized gas and stellar components in 126 nearby galaxies, comprising ∼15,000 individual lines of sight. In the context of this work, and to provide easy yet robust access to this large volume of data, we have used one main source of data to perform our analysis.

The edge_pydb database (T. Wong et al. 2021, in preparation) is a versatile PYTHON environment that allows easy access and filtering of the EDGE-CALIFA data in the variety of analyses we aim to perform. edge_pydb encompasses a combination of global galaxy properties and spatially resolved information, with a special emphasis on estimation of the CO moments from smoothed and masked versions of the CARMA CO data cubes. All data have been convolved to a common angular resolution of 7''. By using the PIPE3D data analysis pipeline (see Sánchez et al. 2016a, 2016b, for more details), the convolved optical data cubes are reprocessed to generate two-dimensional maps at 7'' resolution. The pipeline fits the stellar continuum to the emission lines for each spaxel in each datacube (adopting a Salpeter 1955 initial mass function (IMF)), generating maps sampled on a square grid with a spacing of 3'' in R.A. and decl. To identify a given pixel in the grid, the data are organized by using a reference position (taken from HyperLEDA¹³ ) and an offset indicating spatial position. The final database also contains ancillary data, including information from HyperLEDA and NED,¹⁴ among others.

3. Methods

3.1. Stacking of the CO Spectra

Although many EDGE-CALIFA galaxies have high signal-to-noise detections of CO emission in their central regions, emission is generally faint in their outer parts. Typically, the decrease in emission takes place from r = 0.5r₂₅ outward (around 1.1R_e, by assuming that r₂₅ ≈ 2.7R_e; Sánchez et al. 2014). Bolatto et al. (2017) published maps of velocity-integrated CO emission and discussed various masking techniques for recovering flux and producing maps with good signal-to-noise ratio; even so, they tend to miss flux in regions of weak emission and to underestimate the CO flux (see Figure 9 in Bolatto et al. 2017). Since one of the main goals of this work is to find how the H₂ content changes as a function of radius, it is essential to recover the low-brightness CO emission line in the outermost parts of galaxies.

Maps with both good spatial coverage and good sensitivity are crucial to set thresholds and timescales for these dependencies. In order to cover a broad range of galactocentric radii, we perform spectral stacking of the ¹²CO (J = 1 − 0) emission using the Hα velocities to coherently align the spectra while integrating in rings. The CO spectral stacking helps recover CO flux in the outer parts of our galaxies, improving our ability to probe the SFE_gas in a variety of environments. Many of the molecular gas surveys have measured some of these dependencies in a similar fashion (e.g., using the CO (J = 2 − 1) spectral stacking; Schruba et al. 2011), although they mostly covered a small range of morphological types and/or stellar masses, or were limited to very local volumes that are subject to cosmic variance because they represent our particular local environment. Although the EDGE-CALIFA survey does not yet encompass resolved Hi observations, we will explore the efficiency with respect to total gas and compare it to previous results by assuming a prescription for the atomic gas while keeping in mind the limitations of this methodology.

We perform a CO emission-line stacking procedure following the methodology described by Schruba et al. (2011). The method relies on using the IFU Hα velocity data to define the velocity range for integrating CO emission. The key assumption of this method is that both the Hα and the CO velocities are similar at any galaxy location. This assumption is consistent with results by Levy et al. (2018), who found a median value for the difference between the CO and Hα rotation curve of ΔV = V_rot(CO) − V_rot(Hα) = 14 km s⁻¹ (within our 20 km s⁻¹ channel width) when analyzing a subsample of 17 EDGE-CALIFA rotation-dominated galaxies. As we will discuss later, after shifting CO spectra to the Hα velocity, we integrate over a window designed to minimize missing CO flux. The smaller the velocity differences between CO and Hα, the better the signal-to-noise ratio. Similarly, the smaller the velocity window we implement, the smaller the noise in the integrated flux estimate.

We constructed an algorithm coded in PYTHON that implements this procedure. Since we are interested in radial variations in galactic properties, we stack in radial bins 0.1r₂₅ wide. In practice, galactocentric radius is usually a well-determined observable, and it is covariant with other useful local parameters, which makes it a very useful ordinate (Schruba et al. 2011).

We recover the CO line emission by applying radial stacking based on the following steps: We convert Hα velocity from the optical into the radio velocity convention. Then, for each spaxel in an annulus we shift the CO spectrum by the negative Hα velocity. This step aligns the CO spectrum for each line of sight at zero velocity if the intrinsic Hα and CO velocities are identical. We then average all the velocity-shifted CO spaxels in an annulus and integrate the resulting average spectrum over a given velocity window to produce the average intensity in the annulus.

Figure 1 shows the usefulness of the stacking procedure in recovering CO emission. As an example, we show the average CO spectrum of NGC 0551 within an annulus that spans from 0.65 to 0.75 r₂₅ (∼1.3–1.7 R_e). The left panel contains the average CO spectra within the given annulus using the observed velocity frame, while the right panel shows the average CO spectra after shifting by the observed Hα velocity. If the CO and Hα velocities are identical for all spaxels, then the resulting CO emission would appear at zero velocity. This procedure allows us to co-add CO intensities coherently and reject noise. Figure 1 also shows the best Gaussian fit for the averaged-stacked spectra. We expect that in an ideal case the total intensity integrated over the full velocity range (∼860 km s⁻¹) is exactly the same in both cases, but the noise would be much larger without the spectral stacking. Without performing the stacking procedure, the CO line emission is not evident, and the signal-to-noise ratio in the measurement of CO velocity-integrated intensity is lower. Interferometric deconvolution artifacts that produce negative intensities at some velocities, resulting from incomplete uv sampling and spatial filtering, would also get into the integration more easily without stacking and artificially reduce the intensity.

3.2. Extracting Fluxes from Stacked Spectra

After we compute the stacked spectra, we extract the total CO fluxes for each annulus as a function of galactocentric radius. To do this in a way that is likely to include all the CO flux but minimizes the noise, we want to select a matched velocity range that is just large enough to include all CO emission and exclude the baseline (which only adds noise). In order to investigate the ideal integration range, we fit Gaussian profiles to each averaged-stacked CO spectrum with a detection. We reject fits that have central velocities more than ±80 km s⁻¹ from zero velocity. We also reject spectra with FWHMs narrower than 40 km s⁻¹ (two channels). Results for valid stacked spectra fits are shown in the top panel of Figure 2, color-coded by the reduced chi-squared of the fit and plotted against normalized galactocentric radius.

**Figure 2.** Top: FWHM of CO line as a function of galactocentric radius. Small colored circles show the FWHM of a Gaussian fit to the stacked spectrum in an annulus. Large green squares indicate the FWHM lying above 80% of the points at that radius, and the dashed green line is the fit to the squares; we use this function to define the window of flux integration as a function of r_gal. The gray dashed line marks the limit at which we reject spectra with a Gaussian fit narrower than 40 km s⁻¹ (two channels in the CO data cubes). Bottom: ratio between the final stacked and unstacked integrated CO (1–0) line intensity per annulus for annuli located at r/r₂₅ > 0.5, which include just 2σ detection spaxels.
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We use these data to define a velocity window for the integrated CO line emission fluxes in the stacked spectra. For each radial bin, we define an integration range that guarantees that we integrate the CO line profile between ±FWHM in at least 80% of annuli. This is represented by the green circles in Figure 2. We assume that this window is sufficient to contain most of the CO flux, and we can use it to compute errors where no CO is detected. To obtain a prescription, we fit the best third-order polynomial to the green squares (green dashed line) as a function of galactocentric radius, FWHM(r_gal). Finally, we recompute the CO line emission fluxes for the stacked spectra by integrating the CO stacked spectrum over ± FWHM(r_gal). We extract the integrated flux uncertainties by taking the rms from the emission-free part of the stacked CO spectra.

Using spectral stacking, we reach a typical deprojected CO intensity 3σ uncertainty of I_CO ≈ 0.25 K km s⁻¹, or a 3σ surface density sensitivity of Σ_mol ≈ 1.1 M_⊙ pc⁻², which represents the typical sensitivity in the outermost regions of galaxy disks. The bottom panel of Figure 2 shows the ratio between the final stacked and unstacked integrated CO (1–0) line intensity, per annulus, located at r > 0.5r₂₅ (or r > 1.3R_e), and includes just 2σ detection spaxels. The histogram shows that the distribution peaks at $\mathrm{log}[{I}_{\mathrm{CO},\mathrm{Stack}}/{I}_{\mathrm{CO},\mathrm{Unstack}}]\sim 0.47$ , meaning that, overall, we are recovering ∼3 times more flux with the stacking procedure.

3.3. Basic Equations and Assumptions

To compute the extinction-corrected SFRs, we estimate the extinction (based on the Balmer decrement; see Bolatto et al. 2017) for each 7'' spaxel using

$\begin{eqnarray}&&{A}_{{\rm{H}}\alpha }=5.86\mathrm{log}\left(\displaystyle \frac{{F}_{{\rm{H}}\alpha }}{2.86{F}_{{\rm{H}}\beta }}\right),\end{eqnarray} \tag{ 1 }$

where F_Hα and F_Hβ are the fluxes of the respective Balmer lines, and the coefficients assume a Cardelli et al. (1989) extinction curve and an unextincted flux ratio of 2.86 for case B recombination. Then, the corresponding SFR (in M_⊙ yr⁻¹) is obtained using (Rosa-González et al. 2002)

$\begin{eqnarray}&&\mathrm{SFR}=1.61\times 7.9\times {10}^{-42}{F}_{{\rm{H}}\alpha }{10}^{\tfrac{{A}_{{\rm{H}}\alpha }}{2.5}},\end{eqnarray} \tag{ 2 }$

which adopts a Salpeter initial mass function (IMF) corrected by a factor of 1.61 to move it to a Kroupa IMF (Speagle et al. 2014). We use this to compute the SFR surface density, Σ_SFR in M_⊙ yr⁻¹ kpc⁻², by dividing by the face-on area corresponding to a 7'' spaxel, given the angular diameter distance to the galaxy.

The gas surface density is computed as Σ_gas = Σ_mol + Σ_atom, where ${{\rm{\Sigma }}}_{{{\rm{H}}}_{2}}$ is derived from the integrated CO intensity, I_CO, by adopting a Milky Way constant CO-to-H₂ conversion factor, X_CO = 2 × 10²⁰ cm⁻² (K km s⁻¹)⁻¹ (or α_CO = 4.3 M_⊙ ${[{\rm{K}}\,\mathrm{km}\,{{\rm{s}}}^{-1}\,{\mathrm{pc}}^{-2}]}^{-1}$ ). For the CO J = 1 − 0 emission line, we use the following expression to obtain Σ_mol (i.e., Leroy et al. 2008):

$\begin{eqnarray}&&{{\rm{\Sigma }}}_{\mathrm{mol}}=4.4\cos i\,{I}_{\mathrm{CO}},\end{eqnarray} \tag{ 3 }$

where I_CO is in K km s⁻¹, Σ_mol is in M_⊙ pc⁻², and i is the inclination of the galaxy. This equation takes into account the mass correction due to the cosmic abundance of helium.

To include in our calculations Σ_atom despite the fact that we do not have resolved HI data, we assume a constant Σ_atom = 6 M_⊙ pc⁻² for face-on disks. This is approximately correct (within a factor of 2) for spiral galaxies out to r ∼ r₂₅ (Walter et al. 2008; Leroy et al. 2008). This value is also in agreement with Monte Carlo simulations performed by Barrera-Ballesteros et al. (2021) to test different values of Σ_atom; they obtain a normal distribution of Σ_atom = 7 M_⊙ pc⁻², with a standard deviation of 2 M_⊙ pc⁻². We also test the influence of metallicity in the CO-to-H₂ conversion factor, α_CO, by using the following equation (from Equation (31) in Bolatto et al. 2013):

$\begin{eqnarray}&&{\alpha }_{\mathrm{CO}}=2.9\exp \left(\displaystyle \frac{+0.4}{Z^{\prime} {{\rm{\Sigma }}}_{\mathrm{GMC}}^{100}}\right){\left(\displaystyle \frac{{{\rm{\Sigma }}}_{\mathrm{total}}}{100\,{M}_{\odot }\,{{pc}}^{-2}}\right)}^{-\gamma },\end{eqnarray} \tag{ 4 }$

in M_⊙ ${({\rm{K}}\,{\mathrm{kms}}^{-1}\,{\mathrm{pc}}^{-2})}^{-1}$ , γ ≈ 0.5 for Σ_total > 100 M_⊙ pc⁻² and γ = 0 otherwise. We adopt the empirical calibrator based on the O3N2 ratio from Marino et al. (2013), and then we use Equation (2) from Marino et al. (2013) to obtain the oxygen abundances, $12+\mathrm{log}({\rm{O}}/{\rm{H}})$ . Finally, we derive the metallicity normalized to the solar value, $Z^{\prime} ={[{\rm{O}}/{\rm{H}}]/[{\rm{O}}/{\rm{H}}]}_{\odot }$ , where [O/H]_⊙ = 4.9 × 10⁻⁴ (Baumgartner & Mushotzky 2006).

Although there are many definitions for star formation efficiency (SFE_gas), in this work we use SFR surface density per unit neutral gas surface density (atomic and molecular), Σ_gas = Σ_mol + Σ_atom, in units of yr⁻¹ for each line of sight,

$\begin{eqnarray}&&{\mathrm{SFE}}_{\mathrm{gas}}=\displaystyle \frac{{{\rm{\Sigma }}}_{\mathrm{SFR}}}{{{\rm{\Sigma }}}_{\mathrm{gas}}}.\end{eqnarray} \tag{ 5 }$

Midplane gas pressure, P_h, is computed using the expression by Elmegreen (1989),

$\begin{eqnarray}&&{P}_{{\rm{h}}}\approx \displaystyle \frac{\pi }{2}\,G\,{{\rm{\Sigma }}}_{\mathrm{gas}}^{2}+\displaystyle \frac{\pi }{2}\,G\,\displaystyle \frac{{\sigma }_{{\rm{g}}}}{{\sigma }_{\star ,z}}{{\rm{\Sigma }}}_{\star }{{\rm{\Sigma }}}_{\mathrm{gas}},\end{eqnarray} \tag{ 6 }$

where σ_g and σ_⋆,z are the gas and star dispersion velocities, respectively. We correct the Σ_⋆ by the same 1.61 factor used for the SFR to translate them to a Kroupa IMF. We assume σ_g = 11 km s⁻¹, which has been found to be a typical value in regions where H i is dominant (Leroy et al. 2008). This value is also in agreement with the second-moment maps included in Tamburro et al. (2009), and it is also consistent with the CO velocity dispersion for a subsample of EDGE-CALIFA galaxies (Levy et al. 2018). σ_⋆,z is the vertical velocity dispersion (in km s⁻¹) of stars. Although the EDGE-CALIFA database includes σ_z measurements that could allow us to model σ_⋆,z, the instrumental resolution of the survey constrains us to use them just in the central parts of the galaxies (for details, see Sánchez et al. 2012). Therefore, and following the assumptions and derivation included in Leroy et al. (2008), we use the following expression for σ_⋆,z:

$\begin{eqnarray}&&{\sigma }_{\star ,z}=\sqrt{\displaystyle \frac{2\pi {{Gl}}_{\star }}{7.3}}{{\rm{\Sigma }}}_{\star }^{0.5},\end{eqnarray} \tag{ 7 }$

where l_⋆ is the disk stellar exponential scale length obtained by fitting azimuthally averaged profiles to Σ_⋆ in the SDSS r band and G = 4.301 × 10⁻³ pc M ${}_{\odot }^{-1}$ km² s⁻². In cases where we do not have l_⋆ measurements, we use the relation l_⋆ = [0.25 ± 0.01]r₂₅ since it corresponds to the best linear fit for our data. See Section 4.1 for more information about how both l_⋆ and the l_⋆−r₂₅ relation are derived.

The dynamical equilibrium pressure (P_DE) is computed following a similar methodology to that for P_h (e.g., Elmegreen & Parravano 1994; Herrera-Camus et al. 2017; Fisher et al. 2019; Schruba et al. 2019). Assuming that the gas disk scale height is much smaller than the stellar scale height, and neglecting the gravity from dark matter, we write P_DE as (Sun et al. 2020)

$\begin{eqnarray}&&{P}_{\mathrm{DE}}\approx \displaystyle \frac{\pi }{2}\,G\,{{\rm{\Sigma }}}_{\mathrm{gas}}^{2}+{{\rm{\Sigma }}}_{\mathrm{gas}}{\sigma }_{\mathrm{gas},{\rm{z}}}\sqrt{2\,G\,{\rho }_{\star }}.\end{eqnarray} \tag{ 8 }$

Here, we assume that σ_gas,z = σ_g = 11 km s⁻¹, and ρ_⋆ is the midplane stellar volume density from the observed surface density in a kiloparsec-sized aperture,

$\begin{eqnarray}&&{\rho }_{\star }=\displaystyle \frac{{{\rm{\Sigma }}}_{\star }}{0.54{l}_{\star }}.\end{eqnarray} \tag{ 9 }$

This equation assumes that the exponential stellar scale height, h_⋆, is related to the stellar scale length, l_⋆, by h_⋆/l_⋆ = 7.3 ± 2.2 (Kregel et al. 2002).

The orbital timescale, τ_orb, is usually used in the analysis of star formation law dependencies since it can be comparable to timescale of the star formation (e.g., Silk 1997; Elmegreen 1997). Following Kennicutt (1998) and Wong & Blitz (2002), we compute τ_orb using

$\begin{eqnarray}&&{\tau }_{\mathrm{orb}}^{-1}=\displaystyle \frac{v\left({r}_{\mathrm{gal}}\right)}{2\pi {r}_{\mathrm{gal}}},\end{eqnarray} \tag{ 10 }$

where $v\left({r}_{\mathrm{gal}}\right)$ is the rotational velocity at a galactocentric radius r_gal. We obtain the Hα rotation curves for EDGE-CALIFA galaxies from Levy et al. (2018). We use them to adjust a universal rotation curve (URC; Persic et al. 1996) for each galaxy to avoid the noise in the inner and outer edges of the Hα rotation curves.

We compute the Toomre's instability parameter (Toomre 1964, Q) including the effect of stars (Rafikov 2001). The Toomre's instability parameter for the stellar component (Q_star) is

$\begin{eqnarray}&&{Q}_{\mathrm{stars}}=\displaystyle \frac{{\sigma }_{\star ,r}\kappa }{\pi G{{\rm{\Sigma }}}_{\star }},\end{eqnarray} \tag{ 11 }$

where σ_⋆,r is the radial velocity dispersion of the stars. We compute it using σ_⋆,r = 1.67 σ_⋆,z, valid for most late-type galaxies (Shapiro et al. 2003). The parameter κ is the epicyclic frequency and can be computed as

$\begin{eqnarray}&&\kappa =1.41\displaystyle \frac{v(r)}{r}\sqrt{1+\beta },\end{eqnarray} \tag{ 12 }$

where $\beta =\tfrac{d\mathrm{log}\,v\left(r\right)}{d\mathrm{log}r}$ . This derivative is computed based on the URC fit to the Hα rotation curve. The Toomre's instability parameter for the gas (Q_gas) is

$\begin{eqnarray}&&{Q}_{\mathrm{gas}}=\displaystyle \frac{{\sigma }_{\mathrm{gas}}\kappa }{\pi G{{\rm{\Sigma }}}_{\mathrm{gas}}}=\displaystyle \frac{(11\,\mathrm{km}\,{{\rm{s}}}^{-1})\kappa }{\pi G{{\rm{\Sigma }}}_{\mathrm{gas}}}.\end{eqnarray} \tag{ 13 }$

Since Σ_⋆ and Σ_gas are averaged and stacked by annuli, respectively, then both Q_stars and Q_gas are derived radially. The condition for instability in the gas+stars disk is then given by

$\begin{eqnarray}&&\displaystyle \frac{1}{{Q}_{\mathrm{star}+\mathrm{gas}}}=\displaystyle \frac{2}{{Q}_{\mathrm{stars}}}\displaystyle \frac{q}{1+{q}^{2}}+\displaystyle \frac{2}{{Q}_{\mathrm{gas}}}R\displaystyle \frac{q}{1+{q}^{2}{R}^{2}}\gt 1,\end{eqnarray} \tag{ 14 }$

where q = k σ_⋆,r/κ. Here, k = 2π/λ is the wavenumber at maximum instability. Finally, R = σ_g/σ_⋆,r.

4. Results and Discussion

4.1. Exponential Scale Lengths

To investigate the spatial relationship between molecular and stellar components, we compute their exponential scale lengths, l_mol and l_⋆, respectively, for a subsample of 68 galaxies. Out of the 81 EDGE-CALIFA galaxies with i < 75° , these galaxies are selected since their disks are well fitted by exponential profiles and they have at least three annuli available for the fitting. To avoid annuli within the bulge or with significant variations in α_CO usually found in central regions of galaxies (e.g., Sandstrom et al. 2013), we do not include Σ_mol and Σ_⋆ for r_gal ≤ 1.5 kpc.

It is well known that the CO distribution and star formation activity are closely related (e.g., Leroy et al. 2013). For instance, Leroy et al. (2009) showed that HERACLES spiral galaxies can be well described by exponential profiles for CO emission in the H₂-dominated regions of the disk, with similar CO scale lengths to those for old stars and star-forming tracers, and an early study on the EDGE sample found similar results (Bolatto et al. 2017). Here we use the stacking technique to extend the molecular radial profiles and obtain a better measurement of the distribution.

Although molecular clouds have lifetimes spanning a few to several Myr (similar to the stars that give rise to the Hα emission used to compute SFR; e.g., Blitz & Shu 1980; Kawamura et al. 2009; Gratier et al. 2012), these are quite short compared with lifetimes of the stellar population in galaxies in the EDGE-CALIFA survey (0.4–3.9 Gyr; Barrera-Ballesteros et al. 2021). Consequently, it is not necessarily expected to have comparable distributions for the molecular and the stellar components. However, stellar and CO emission distributions can be similar when the process of converting atomic gas to molecular is driven by the stellar potential (Blitz & Rosolowsky 2004; Ostriker et al. 2010). For instance, Schruba et al. (2011) showed a clear correspondence between l_CO and r₂₅; this correlation is maintained even in the H i-dominated regions of the disk, supporting the role that molecular gas plays in a scenario when the stellar potential well is relevant in collecting material for star formation (Blitz & Rosolowsky 2006). Thus, it is interesting to use the CO stacked data to verify whether the exponential decay of Σ_mol holds in the outer parts of EDGE-CALIFA galaxies.

The left panel of Figure 3 shows the relation between l_mol and l_⋆. The l_⋆ values were obtained by fitting exponential profiles to Σ_*(r_gal), after averaging it in annuli, while l_mol values were determined from Σ_mol(r_gal) derived from the CO stacking procedure. The left panel of Figure 3 also shows the ordinary least-squares (OLS) bisector fit weighted by the uncertainties for all scale lengths measured with better than 3σ significance (blue dashed line); we find that l_mol = [0.89 ± 0.04] l_⋆. This result is in agreement with the relation found by Bolatto et al. (2017) for 46 EDGE-CALIFA galaxies, who obtain l_mol = [1.05 ± 0.06] l_⋆. Compared with Bolatto et al. (2017), however, the CO radial stacking allows us to compute exponential length scales for a larger galaxy sample (68 in our case) and to constrain them better over a broader range of galactocentric radii. Our results are also in agreement with the exponential length scales for HERACLES (l_mol = [0.9 ± 0.2] l_⋆; Leroy et al. 2008). The inset in the left panel of Figure 3 shows the relation between l_mol and r₂₅. Using an OLS bisector fit, we find that l_mol = [0.22 ± 0.01] × r₂₅, which agrees reasonably with Young et al. (1995), who find l_mol ≈ 0.22r₂₅.

In general, resolved molecular gas surveys exhibit similarity between the stellar light and the CO distributions. Regan et al. (2001), using the CO distribution from the BIMA SONG CO survey, showed that when comparing the scale lengths from exponential fits to the CO and the K-band galaxy profile data for 15 galaxies, the typical ratio of CO to stellar scale length is 0.88 ± 0.14. Additionally, single-dish CO measurements plus 3.6 μm data from the HERACLES galaxies show a correspondence between the stellar and molecular disk (Leroy et al. 2008; Schruba et al. 2011), with an exponential scale length for CO that follows l_mol ≈ 0.2 r₂₅.

If the radial distributions for molecular gas and stars are similar, we would expect the radii containing 50% of the CO emission and the starlight to also be similar. The right panel of Figure 3 demonstrates that our data confirm this expectation, as it shows the relation between the radii that enclose 50% of the molecular gas and the stellar mass, R_50,mol and R_50,⋆, respectively. The dashed blue line represents an ordinary least-squares bisector fit (weighted by the uncertainties) for all our 3σ detections; we find that R_50,mol = [0.95 ± 0.03] × R_50,⋆.

Table 1 summarizes the properties of the 81 EDGE-CALIFA galaxies included in this work, together with the values for l_mol, l_⋆, R_50,mol, and R_50,⋆ for the 68 galaxies analyzed in this section.

Table 1. Main Properties of the 81 EDGE-CALIFA Galaxies Analyzed in This Work

Name	Dist. (Mpc)	$\mathrm{log}[{M}_{\star }/{M}_{\odot }]$	Morph. Class	$\mathrm{log}[{M}_{\mathrm{mol}}/{M}_{\odot }]$	Nuclear	l_⋆ (kpc)	l_mol (kpc)	R_50,⋆ (kpc)	R_50,mol (kpc)
ARP 220	78.0	10.91 ± 0.09	Sm	9.72 ± 0.0	LINER	2.76 ± 0.24	1.7 ± 0.35	3.88 ± 0.24	2.86 ± 0.35
IC 0944	100.8	11.26 ± 0.1	Sa	10.0 ± 0.02	SF	4.41 ± 0.11	4.26 ± 0.39	7.14 ± 0.11	7.85 ± 0.39
IC 1151	30.8	10.02 ± 0.1	SBc	7.93 ± 0.14	⋯	2.66 ± 0.07	2.76 ± 0.78	4.06 ± 0.07	4.61 ± 0.78
IC 1199	68.3	10.78 ± 0.1	Sbc	9.35 ± 0.04	SF	4.53 ± 0.06	3.99 ± 0.44	7.52 ± 0.06	6.97 ± 0.44
IC 1683	69.7	10.76 ± 0.11	Sb	9.68 ± 0.02	SF	5.56 ± 0.79	2.49 ± 0.13	8.92 ± 0.79	3.99 ± 0.13
IC 4566	80.7	10.76 ± 0.11	SABb	9.68 ± 0.02	⋯	<3.55	<4.4	<5.97	<8.35
NGC 0447	79.7	11.43 ± 0.1	S0-a	9.33 ± 0.05	⋯	4.56 ± 0.7	10.0 ± 0.23	6.58 ± 0.7	9.09 ± 0.23
NGC 0477	85.4	10.9 ± 0.12	Sc	9.54 ± 0.05	SF	<9.01	<21.78	<14.43	<35.98
NGC 0496	87.5	10.85 ± 0.13	Sbc	9.48 ± 0.04	SF	7.35 ± 0.34	4.11 ± 0.36	12.46 ± 0.34	7.13 ± 0.36
NGC 0528	68.8	11.06 ± 0.1	S0	8.36 ± 0.13	⋯	⋯	⋯	⋯	⋯
NGC 0551	74.5	10.95 ± 0.11	SBbc	9.39 ± 0.04	⋯	4.73 ± 0.07	8.17 ± 1.68	8.01 ± 0.07	13.47 ± 1.68
NGC 1167	70.9	11.48 ± 0.09	S0	9.28 ± 0.06	LINER	⋯	⋯	⋯	⋯
NGC 2253	51.2	10.81 ± 0.11	Sc	9.62 ± 0.02	SF	2.48 ± 0.07	2.1 ± 0.28	3.77 ± 0.07	4.07 ± 0.28
NGC 2347	63.7	11.04 ± 0.1	Sb	9.56 ± 0.02	LINER	2.15 ± 0.06	1.99 ± 0.38	3.86 ± 0.06	4.5 ± 0.38
NGC 2486	67.5	10.79 ± 0.09	Sa	<9.05	⋯	⋯	⋯	⋯	⋯
NGC 2487	70.5	11.06 ± 0.1	Sb	9.47 ± 0.05	⋯	<4.23	<16.66	<5.88	<24.85
NGC 2639	45.7	11.17 ± 0.09	Sa	9.36 ± 0.02	LINER	1.78 ± 0.01	2.88 ± 0.74	2.93 ± 0.01	4.29 ± 0.74
NGC 2730	54.8	10.13 ± 0.09	Sd	9.0 ± 0.06	⋯	5.62 ± 0.62	3.79 ± 0.25	9.57 ± 0.62	6.25 ± 0.25
NGC 2880	22.7	10.56 ± 0.08	E-S0	<7.93	⋯	⋯	⋯	⋯	⋯
NGC 2906	37.7	10.59 ± 0.09	Sc	9.11 ± 0.03	INDEF	1.72 ± 0.08	1.59 ± 0.4	2.71 ± 0.08	3.0 ± 0.4
NGC 2916	53.2	10.96 ± 0.08	Sb	9.05 ± 0.06	AGN	⋯	⋯	⋯	⋯
NGC 3303	89.8	11.17 ± 0.1	Sa	9.57 ± 0.04	LINER	3.62 ± 0.23	1.99 ± 0.11	4.97 ± 0.23	3.47 ± 0.11
NGC 3381	23.4	9.88 ± 0.09	SBb	8.11 ± 0.08	⋯	⋯	⋯	⋯	⋯
NGC 3687	36.0	10.51 ± 0.11	Sbc	<8.42	⋯	<1.86	<39.56	<2.63	<66.35
NGC 3811	44.3	10.64 ± 0.11	SBc	9.28 ± 0.03	⋯	2.36 ± 0.09	2.18 ± 0.26	2.93 ± 0.09	2.96 ± 0.26
NGC 3815	53.6	10.53 ± 0.09	Sab	9.16 ± 0.04	⋯	2.0 ± 0.16	1.68 ± 0.27	3.05 ± 0.16	3.4 ± 0.27
NGC 3994	44.7	10.59 ± 0.11	Sc	9.26 ± 0.03	⋯	1.09 ± 0.04	1.31 ± 0.08	1.78 ± 0.04	2.23 ± 0.08
NGC 4047	49.1	10.87 ± 0.1	Sb	9.66 ± 0.02	SF	2.37 ± 0.02	1.26 ± 0.25	3.9 ± 0.02	3.11 ± 0.25
NGC 4185	55.9	10.86 ± 0.11	SBbc	9.08 ± 0.07	INDEF	4.98 ± 0.23	4.45 ± 0.85	8.19 ± 0.23	7.49 ± 0.85
NGC 4210	38.8	10.51 ± 0.1	Sb	8.86 ± 0.05	LINER	⋯	⋯	⋯	⋯
NGC 4211 NED02	96.9	10.53 ± 0.13	S0-a	9.29 ± 0.06	⋯	<6.65	<10.52	<8.93	<17.82
NGC 4470	33.4	10.23 ± 0.09	Sa	8.59 ± 0.06	SF	1.73 ± 0.05	1.25 ± 0.29	3.04 ± 0.05	2.42 ± 0.29
NGC 4644	71.6	10.68 ± 0.11	Sb	9.2 ± 0.05	⋯	2.7 ± 0.05	3.15 ± 0.8	4.91 ± 0.05	5.88 ± 0.8
NGC 4676A	96.6	10.86 ± 0.1	S0-a	9.88 ± 0.02	SF	⋯	⋯	⋯	⋯
NGC 4711	58.8	10.58 ± 0.09	SBb	9.18 ± 0.05	SF	2.83 ± 0.06	6.24 ± 0.54	4.86 ± 0.06	10.44 ± 0.54
NGC 4961	36.6	9.98 ± 0.1	SBc	8.41 ± 0.08	⋯	1.39 ± 0.08	1.59 ± 0.33	2.1 ± 0.08	2.67 ± 0.33
NGC 5000	80.8	10.94 ± 0.1	Sbc	9.45 ± 0.04	SF	5.16 ± 0.61	1.06 ± 0.26	6.51 ± 0.61	2.31 ± 0.26
NGC 5016	36.9	10.47 ± 0.09	SABb	8.9 ± 0.04	⋯	1.67 ± 0.02	2.32 ± 0.42	2.89 ± 0.02	3.93 ± 0.42
NGC 5056	81.1	10.85 ± 0.09	Sc	9.45 ± 0.04	⋯	4.22 ± 0.51	3.12 ± 0.48	5.44 ± 0.51	5.99 ± 0.48
NGC 5205	25.1	9.98 ± 0.09	Sbc	8.37 ± 0.07	LINER	<1.57	<2.13	<2.35	<3.61
NGC 5218	41.7	10.64 ± 0.09	SBb	9.86 ± 0.01	⋯	1.65 ± 0.08	1.43 ± 0.18	2.79 ± 0.08	1.93 ± 0.18
NGC 5394	49.5	10.38 ± 0.11	SBb	9.62 ± 0.01	SF	2.18 ± 0.27	2.7 ± 0.21	3.36 ± 0.27	4.43 ± 0.21
NGC 5406	77.8	11.27 ± 0.09	Sbc	9.69 ± 0.04	LINER	4.97 ± 0.26	7.54 ± 1.9	7.23 ± 0.26	12.77 ± 1.9
NGC 5480	27.0	10.18 ± 0.08	Sc	8.92 ± 0.03	LINER	2.41 ± 0.1	1.27 ± 0.2	4.04 ± 0.1	2.35 ± 0.2
NGC 5485	26.9	10.75 ± 0.08	S0	<8.09	LINER	⋯	⋯	⋯	⋯
NGC 5520	26.7	10.07 ± 0.11	Sb	8.67 ± 0.03	⋯	1.19 ± 0.07	0.9 ± 0.11	1.67 ± 0.07	1.77 ± 0.11
NGC 5614	55.7	11.22 ± 0.09	Sab	9.84 ± 0.01	⋯	2.25 ± 0.28	1.34 ± 0.16	3.67 ± 0.28	3.1 ± 0.16
NGC 5633	33.4	10.4 ± 0.11	Sb	9.14 ± 0.02	SF	1.36 ± 0.03	1.4 ± 0.26	2.47 ± 0.03	2.61 ± 0.26
NGC 5657	56.3	10.5 ± 0.1	Sb	9.11 ± 0.04	⋯	2.11 ± 0.07	1.88 ± 0.13	3.63 ± 0.07	3.37 ± 0.13
NGC 5682	32.6	9.59 ± 0.11	Sb	<8.29	SF	2.11 ± 0.05	1.47 ± 0.34	3.57 ± 0.05	2.21 ± 0.34
NGC 5732	54.0	10.23 ± 0.11	Sbc	8.82 ± 0.07	SF	2.42 ± 0.09	1.78 ± 0.11	3.92 ± 0.09	3.34 ± 0.11
NGC 5784	79.4	0.0 ± 0.0	S0	9.4 ± 0.04	⋯	2.4 ± 0.32	1.41 ± 0.13	3.28 ± 0.32	3.46 ± 0.13
NGC 5876	46.9	10.78 ± 0.1	SBab	<8.56	⋯	⋯	⋯	⋯	⋯
NGC 5908	47.1	10.95 ± 0.1	Sb	9.94 ± 0.01	⋯	2.92 ± 0.01	1.73 ± 0.34	4.98 ± 0.01	4.55 ± 0.34
NGC 5930	37.2	10.61 ± 0.11	SABa	9.33 ± 0.02	⋯	1.57 ± 0.07	0.82 ± 0.03	2.66 ± 0.07	1.98 ± 0.03
NGC 5934	82.7	10.87 ± 0.09	Sa	9.81 ± 0.02	⋯	3.07 ± 0.18	2.5 ± 0.17	5.17 ± 0.18	4.36 ± 0.17
NGC 5947	86.1	10.87 ± 0.1	SBbc	9.26 ± 0.06	AGN	<4.15	<4.7	<5.25	<7.83
NGC 5953	28.4	10.38 ± 0.11	S0-a	9.49 ± 0.01	⋯	1.16 ± 0.17	0.5 ± 0.07	1.3 ± 0.17	1.23 ± 0.07
NGC 6004	55.2	10.87 ± 0.08	Sc	9.33 ± 0.04	⋯	5.29 ± 0.23	2.82 ± 0.21	8.18 ± 0.23	4.52 ± 0.21
NGC 6027	62.9	11.02 ± 0.1	S0-a0	8.01 ± 0.22	⋯	⋯	⋯	⋯	⋯
NGC 6060	63.2	10.99 ± 0.09	SABc	9.68 ± 0.03	SF	3.85 ± 0.11	4.08 ± 0.52	6.25 ± 0.11	7.59 ± 0.52
NGC 6063	40.7	10.36 ± 0.12	Sc	<8.53	SF	2.65 ± 0.08	3.34 ± 0.83	4.67 ± 0.08	5.99 ± 0.83
NGC 6125	68.0	11.36 ± 0.09	E	<8.83	⋯	⋯	⋯	⋯	⋯
NGC 6146	128.7	11.72 ± 0.09	E	<9.36	⋯	⋯	⋯	⋯	⋯
NGC 6155	34.6	10.38 ± 0.1	Sc	8.94 ± 0.03	SF	2.03 ± 0.06	1.97 ± 0.27	3.32 ± 0.06	3.5 ± 0.27
NGC 6186	42.4	10.62 ± 0.09	Sa	9.46 ± 0.02	⋯	9.48 ± 0.45	5.9 ± 0.28	14.74 ± 0.45	10.39 ± 0.28
NGC 6301	121.4	11.18 ± 0.12	Sc	9.96 ± 0.03	INDEF	9.45 ± 0.39	13.32 ± 3.83	15.5 ± 0.39	20.01 ± 3.83
NGC 6314	95.9	11.21 ± 0.09	Sa	9.57 ± 0.03	INDEF	6.6 ± 0.57	2.41 ± 0.07	7.43 ± 0.57	4.56 ± 0.07
NGC 6394	124.3	11.11 ± 0.1	SBb	9.86 ± 0.04	AGN	5.0 ± 0.34	5.13 ± 0.63	9.02 ± 0.34	9.25 ± 0.63
NGC 7738	97.8	11.21 ± 0.11	Sb	9.99 ± 0.01	LINER	2.42 ± 0.2	1.95 ± 0.02	3.95 ± 0.2	3.81 ± 0.02
NGC 7819	71.6	10.61 ± 0.09	Sb	9.27 ± 0.04	SF	6.91 ± 1.06	2.6 ± 0.69	9.71 ± 1.06	3.15 ± 0.69
UGC 03253	59.5	10.63 ± 0.11	Sb	8.88 ± 0.06	SF	5.15 ± 1.22	2.91 ± 0.72	5.74 ± 1.22	4.83 ± 0.72
UGC 03973	95.9	10.94 ± 0.08	Sb	9.51 ± 0.05	AGN	3.78 ± 0.38	2.91 ± 0.11	5.3 ± 0.38	6.14 ± 0.11
UGC 05108	118.4	11.11 ± 0.11	SBab	9.75 ± 0.04	⋯	4.55 ± 0.16	5.08 ± 0.78	7.56 ± 0.16	7.31 ± 0.78
UGC 05359	123.2	10.86 ± 0.13	SABb	9.65 ± 0.05	SF	5.25 ± 0.15	6.15 ± 1.09	8.95 ± 0.15	11.06 ± 1.09
UGC 06312	90.0	10.93 ± 0.12	Sa	<9.08	⋯	3.29 ± 0.07	4.81 ± 0.44	5.41 ± 0.07	8.73 ± 0.44
UGC 07012	44.3	11.0 ± 2.9	SBc	9.9 ± 0.11	SF	2.31 ± 0.1	0.99 ± 0.17	3.36 ± 0.1	2.0 ± 0.17
UGC 09067	114.5	10.96 ± 0.12	Sab	9.83 ± 0.04	SF	3.39 ± 0.06	3.56 ± 0.34	6.11 ± 0.06	6.8 ± 0.34
UGC 09476	46.6	10.43 ± 0.11	SABc	9.15 ± 0.04	SF	<3.85	<5.37	<5.95	<9.46
UGC 09759	49.2	10.02 ± 0.1	Sb	9.07 ± 0.04	⋯	2.83 ± 0.16	1.09 ± 0.17	4.5 ± 0.16	1.96 ± 0.17
UGC 10205	94.9	11.08 ± 0.1	Sa	9.6 ± 0.04	SF	5.41 ± 0.63	2.57 ± 0.39	6.09 ± 0.63	5.12 ± 0.39

Note. The columns Distance, M_⋆, Morphological Class, and M_mol are taken from Bolatto et al. (2017), where M_mol is computed using α_CO = 4.36 M_⊙ (K km s⁻¹ pc²)⁻¹. The column Nuclear corresponds to the emission-line diagnostic for the optical nucleus spectrum for CALIFA galaxies by García-Lorenzo et al. (2015), who classify the galaxies (with signal-to-noise ratio larger than 3) into star-forming (SF), active galactic nuclei (AGN), and LINER-type galaxies. The columns l_⋆, l_mol, R_50,⋆, and R_50,mol are the exponential scale lengths and the radii that enclose 50% of the molecular gas and the stellar mass computed in Section 4.1, respectively.

A machine-readable version of the table is available.

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4.2. SFE and Local Parameters

In this section, we will look at how local physical parameters affect the star formation efficiency of the total gas, SFE_gas = Σ_SFR/[Σ_atom + Σ_mol], following methodologies similar to those used by HERACLES (Leroy et al. 2008), against which we will compare results. We compute efficiencies by dividing the SFR surface density obtained from Hα corrected for extinction using the Balmer decrement (Equation (2)) by the total gas surface density (Equation (5)). As discussed in Section 3.3, we assume a constant Σ_atom = 6 M_⊙ pc⁻².

The EDGE-CALIFA galaxies are generally at larger distances (∼23–130 Mpc) than the much more local HERACLES sample (3–20 Mpc). Both samples have stellar masses spanning a similar range ( $\mathrm{log}[{M}_{\star }/{M}_{\odot }]=9.4$ –11.4), but EDGE has a larger representation of more massive disks and bulges, as HERACLS includes mostly late Sb and Sc objects and lower-mass galaxies. The parent sample CALIFA galaxies are selected in a large volume to allow adequate representation of the z = 0 population and numbers that allow statistically significant conclusions for all classes of galaxies represented in the survey (Sánchez et al. 2012). The EDGE follow-up selection is biased toward IR-bright objects but otherwise tries to preserve the variety and volume of the mother sample. CALIFA does not include dwarf galaxies. EDGE otherwise spans a larger range of properties and has a larger sample size than HERACLES, although with lower spatial resolution (∼1.5 kpc vs. ∼200 pc).

We correct our calculations by the inclination of the galaxy (with a $\cos i$ factor, where i is the inclination angle) to represent physical "face-on" deprojected surface densities (see Section 3.3). Our typical 1σ uncertainty in the SFE_gas is 0.22 dex, dominated by the CO line emission uncertainties derived from the stacking procedure after error propagation.

4.2.1. SFE and Galactocentric Radius

Figure 4 shows the relation between SFE_gas and galactocentric radius; the four different panels show the grouping of the 81 galaxies. Following modern studies, we use R_e to normalize galactocentric distances, except when we need to compare to published data that use r₂₅. Note that for the EDGE galaxies in this sample, r₂₅ ≈ 2.1R_e. In this figure for clarity we split the Sbc, Sc, and Scd galaxies into two groups by choosing the median of stellar masses of the EDGE-CALIFA sample log₁₀[M_⋆] = 10.7 (Bolatto et al. 2017). In general, there is a decreasing trend for SFE_gas with radius. It is important to note that SFE_gas is a fairly smooth function of radius for a given galaxy. In fact, variations between galaxies are frequently larger than variations between most annuli in a galaxy, indicating that the radial decrease in SFE_gas within a galaxy is often smooth and that galaxy-to-galaxy variations are significant.

Figure 5 shows the radius at which our measured molecular surface density, averaged over an annulus, is the same as our assumed constant surface density in the atomic disk, Σ_mol = Σ_atom = 6 M_⊙ pc⁻². The typical radius at which this happens is r/R_e ∼ [1.1 ± 0.5], or r/r₂₅ ∼ [0.47 ± 0.28] (see inset panel), which agrees with the value of r/r₂₅ ∼ 0.43 ± 0.18 found by Leroy et al. (2008). Note that in Figure 4 the SFE_gas is generally smooth across that radius, suggesting that our assumption of a constant Σ_atom does not play a major role in determining the shape of the total gas SFE_gas.

**Figure 5.** Histogram of galactocentric radii at which ${{\rm{\Sigma }}}_{{{\rm{H}}}_{2}}$ drops to 6 M_⊙ pc⁻², which is the value of Σ_atom assumed for EDGE-CALIFA galaxies in this work. The dashed vertical black line is the mean value of r/R_e at which this occurs, corresponding to 1.1 (0.4r₂₅; see inset panel). The gray area represents the uncertainty in mean value of r/R_e. The inset shows a similar histogram for r/r₂₅.
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Figure 6 shows the average SFE_gas as a function of the normalized galactocentric radius for each of the four different groups of morphological classification used in Figure 4, with ±1σ variation indicated by the color bands. We note a systematic increase in the average SFE_gas from early-type (red shaded area) to late-type galaxies (blue shaded area). The SFE_gas tend to be lower for the early spirals (i.e., S0 and earlier; 10 galaxies), which have a steeper profile when compared with the rest of the morphological groups, and therefore show a significant anticorrelation between SFE_gas and r_gal (Pearson correlation coefficient of r = −0.6). This steepening may reflect the degree of central concentration seen in earlier-type galaxies. Sd−Ir galaxies show an SFE_gas flattening at r_gal < 0.45 r₂₅; however, their small amount (only two galaxies in our sample) does not allow us to conclude that this flattening is statistically significant. When looking at the average SFE_gas value, over r_gal for all the radial profiles (black circles), we find that the SFE_gas decreases exponentially even in regions where the gas is mostly molecular. In EDGE we see a continuous exponential profile for the SFE_gas averaged over all galaxies (black line in Figure 6). Although still within the error bars, this is in contrast to HERACLES, which sees a leveling of the SFE_gas in the inner regions. The greater range of SFE_gas values in our sample may be a reflection of the larger range of galaxy spiral types spanned by EDGE compared to HERACLES, which consisted mostly of late types. In fact, the Sbc, Sc, and Scd galaxies in EDGE-CALIFA (green band) are very consistent with the measurements of HERACLES. Where the gas is dominated by the atomic component, r ≳ 0.4r₂₅, the SFE_gas decreases rapidly to the galaxy edge. Because we assume a constant Σ_atom, this is fundamentally a reflection of the rapid decrease of SFR in the atomic disks.

**Figure 6.** Top: SFE_gas vs. galactocentric radius for different morphological types of galaxies. SFE is averaged at each radius over all galaxies of the selected morphological type; types are indicated by shaded color as described in the legend. The vertical extent of the shaded area for each morphological type is the 1σ scatter distribution for that type (see Figure 4). Circles indicate the average SFE_gas and galactocentric radius in stacked annuli for all EDGE-CALIFA galaxies; the black solid line is the OLS linear bisector fit to those points using the model ${A}_{\mathrm{SFE}}\times \exp (-r/{r}_{\mathrm{SFE}})$ . The error bars are the uncertainties of the mean SFE values in each bin. The two dashed black lines show the effect of increasing and decreasing Σ_atom by a factor of two from its assumed value of 6 M_⊙ pc⁻². The shaded gray band indicates the amount by which the binned SFE_gas would increase if we use the metallicity-dependent prescription for α_CO. The green squares are the HERACLES data for spiral galaxies. The figure shows that SFE_gas depends on radius, stellar mass, and morphological type.
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We can describe the behavior of the SFE_gas for our sample using an ordinary least-squares (OLS) linear bisector method to fit a simple exponential decay:

$\begin{eqnarray}&&{\mathrm{SFE}}_{\mathrm{gas}}=[0.83\pm 0.07\,({\mathrm{Gyr}}^{-1})]\exp \left(\displaystyle \frac{-{r}_{\mathrm{gal}}}{[0.31\pm 0.02]\,{r}_{25}}\right).\end{eqnarray} \tag{ 15 }$

We note that we do not see clear breaks in this trend; instead, we find a continuous smooth exponential decline of SFE_gas as a function of r_gal. This is consistent with the rapid decline of star formation activity in the outer parts of galaxies (e.g., Leroy et al. 2008; Kennicutt 1989; Martin & Kennicutt 2001) and also is in agreement with previous results for low-redshift star-forming galaxies (e.g., Sánchez 2020; Sanchez et al. 2021). In particular, our results agree with the inside-out monotonic decrease of the SFE_gas shown by Sánchez (2020). Sánchez (2020) also finds that galaxies are segregated by morphology; for a given stellar mass, Sánchez shows that late-type galaxies present larger SFE_gas than earlier ones at any r_gal, which is consistent with the trend we observe in Figure 6. In the outer parts, our steeper profiles may be influenced by our assumption of constant H i surface density. However, this does not explain our steeper profiles we also observe in the inner galaxy. The top and bottom dashed lines in Figure 6 show how SFE_gas changes if instead of 6 M_⊙ pc⁻² we use Σ_atom = 3 and 12 M_⊙ pc⁻², which are the two extremes of Σ_atom values found in HERACLES (Leroy et al. 2008). A better match between EDGE and HERACLES would require using Σ_atom = 3 M_⊙ pc⁻², which appears extremely low. Note that these two studies use different SFR tracers: our extinction-corrected Hα may behave differently from the GALEX FUV that dominates the SFR estimate in the outer disks of HERACLES (e.g., Lee et al.2009).

How sensitive is the SFE_gas determination to the CO-to-H₂ conversion factor? To test this, we adopt a variable CO-to-H₂ conversion factor, α_CO, using Equation (4). This includes changes in the central regions caused by high stellar surface densities and changes due to metallicity. When comparing the effects of a constant and a variable prescription of α_CO (shaded area in Figure 6), we observe that the central regions present larger SFE_gas variations than the outer disks within the range of galactocentric distances we study, as the latter do not exhibit $12+\mathrm{log}({\rm{O}}/{\rm{H}})$ significantly below 8.4 according to the O3N2 indicator, as shown in the top panel of Figure 7. Therefore, the variations of the CO-to-H₂ conversion factor are generally small and consistent with the assumption of a constant α_CO.

**Figure 7.** Top: sample distribution of the oxygen abundances, $12+\mathrm{log}({\rm{O}}/{\rm{H}})$ , with the O3N2 as metallicity indicator. The dashed black line is the assumed solar value, which corresponds to $12+\mathrm{log}{({\rm{O}}/{\rm{H}})}_{\odot }=8.69$ . Bottom: the star formation efficiency of the molecular gas, SFE_mol = Σ_SFR/Σ_mol, vs. the ratio between the molecular and the atomic gas surface densities, R_mol = Σ_mol/Σ_atom. Colors coded for galactocentric radius (in R_e) are as indicated by the color bar. Black contours are 80%, 60%, 40%, and 20% of the points just for detections. Large black filled circles show the mean of EDGE-CALIFA data at each stellar surface density bin; the error bars are the uncertainties of the mean SFE_mol values in each bin. The black solid line shows the OLS linear bisector fit for averaged points of SFE_mol over annuli by using the model y = ax + b. The shaded region represents uncertainty of the slope derived from the OLS linear bisector fit. The horizontal dashed blue line is the average SFE_mol, including the 3σ detection, for the sample. The inset panel shows the SFE_mol for detections only as a function of galactocentric radius. The blue dashed line is the average SFE_mol.
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**Figure 7.** Top: sample distribution of the oxygen abundances, $12+\mathrm{log}({\rm{O}}/{\rm{H}})$ , with the O3N2 as metallicity indicator. The dashed black line is the assumed solar value, which corresponds to $12+\mathrm{log}{({\rm{O}}/{\rm{H}})}_{\odot }=8.69$ . Bottom: the star formation efficiency of the molecular gas, SFE_mol = Σ_SFR/Σ_mol, vs. the ratio between the molecular and the atomic gas surface densities, R_mol = Σ_mol/Σ_atom. Colors coded for galactocentric radius (in R_e) are as indicated by the color bar. Black contours are 80%, 60%, 40%, and 20% of the points just for detections. Large black filled circles show the mean of EDGE-CALIFA data at each stellar surface density bin; the error bars are the uncertainties of the mean SFE_mol values in each bin. The black solid line shows the OLS linear bisector fit for averaged points of SFE_mol over annuli by using the model y = ax + b. The shaded region represents uncertainty of the slope derived from the OLS linear bisector fit. The horizontal dashed blue line is the average SFE_mol, including the 3σ detection, for the sample. The inset panel shows the SFE_mol for detections only as a function of galactocentric radius. The blue dashed line is the average SFE_mol.
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So far, we have analyzed the SFE of the total gas, but it is also interesting to test whether the star formation efficiency responds to the phase of the ISM. The bottom panel of Figure 7 shows the star formation efficiency of the molecular gas, SFE_mol = Σ_SFR/Σ_mol (in yr⁻¹), as a function of the ratio between the molecular and the atomic surface densities, R_mol = Σ_mol/Σ_atom. Since we assume Σ_atom = 6 M_⊙ pc⁻², R_mol is a prescription for the Σ_mol normalized by a factor of 6. Although there is large scatter, the figure shows that the SFE_mol, averaged by R_mol bins (black filled circles), remains almost constant over the R_mol range, with an average log[SFE_mol] ∼−9.15 (blue dashed line in the bottom panel of Figure 7). The inset panel shows that the SFE_mol is also fairly constant over the range of galactocentric radii. These results are in agreement with Muraoka et al. (2019), who find a similar flattening in SFE_mol for annuli at r ≲ 0.6r₂₅ when analyzing 80 nearby spiral galaxies selected from the CO Multi-line Imaging of Nearby Galaxies survey (COMING; Sorai et al. 2019). Using CO, FUV+24 μm, and H_α+24 μm data for 33 nearby spiral galaxies selected from the IRAM HERACLES survey (Leroy et al. 2009), Schruba et al. (2011) found that H₂-dominated regions are well parameterized by a fixed SFE_mol equivalent to a molecular gas depletion time of ${\tau }_{\mathrm{dep},\mathrm{mol}}={\mathrm{SFE}}_{\mathrm{mol}}^{-1}\sim 1.4\,\mathrm{Gyr}$ , which is consistent with our average τ_dep,mol ∼ 1.45 ± 0.23 Gyr. As for previous studies, these results support the idea that the vast majority of the star formation activity takes place in the molecular phase of the ISM instead of the atomic gas (e.g., Martin & Kennicutt 2001; Bigiel et al. 2008; Schruba et al. 2011).

We explore possible trends between SFE_gas, galactocentric radius, and nuclear activity. We adopt the nuclear activity classification performed by García-Lorenzo et al. (2015), who classify CALIFA galaxies (with signal-to-noise ratio larger than 3) into star-forming (SF), active galactic nuclei (AGN), and LINER-type galaxies, and we apply it, when available, for the 81 galaxies analyzed in this work (see column Nuclear in Table 1). We do not identify significant trends as a function of galactocentric radius for any of these three categories.

4.2.2. SFE versus Stellar and Gas Surface Density

Since in the previous section we show a clear dependence of SFE_gas on galactocentric distance, it is expected that SFE_gas will also depend on the stellar surface density, Σ_⋆. Indeed, the top panel of Figure 8 shows an approximately power-law relationship between SFE_gas and Σ_⋆. We quantify this relation by using an OLS linear bisector method in logarithmic space to estimate the best linear fit to our data (excluding upper limits), obtaining

$\begin{eqnarray}\begin{array}{rcl}\mathrm{log}[{\mathrm{SFE}}_{\mathrm{gas}}({\mathrm{yr}}^{-1})] & = & [0.32\pm 0.27]\times \mathrm{log}[{{\rm{\Sigma }}}_{\star }\,({M}_{\odot }\,{{pc}}^{-2})]\\ & & -\ [10.13\pm 1.75].\end{array}\end{eqnarray} \tag{ 16 }$

When comparing the EDGE average SFE_gas over Σ_⋆ bins (black circles) with similar HERACLES bins (green squares), we find consistently slightly larger efficiencies at $\mathrm{log}[{{\rm{\Sigma }}}_{\star }({M}_{\odot }\,{{pc}}^{-2})]\lesssim 1.4$ , although the HERACLES points are still within the error bars of our data. Since these points are in the outer regions of the EDGE galaxies, this result may be sensitive to the adoption of Σ_atom = 6 M_⊙ pc⁻². In the inner regions with $\mathrm{log}[{{\rm{\Sigma }}}_{\star }({M}_{\odot }\,{{pc}}^{-2})]\geqslant 2.6$ , our average efficiencies are also higher, although we do not expect these regions to be sensitive to the choice of Σ_atom. Between these two extremes, however, there is good general agreement between the EDGE and HERACLES results.

The middle and bottom panels of Figure 8 show the relation between the H₂-to-H_I ratio (R_mol = Σ_mol/Σ_atom = Σ_mol/6 M_⊙ pc⁻²), Σ_*, and the gas surface density, Σ_gas = Σ_mol + Σ_atom, respectively. In the middle panel, we observe a tight correlation between R_mol and Σ_⋆. The relation is well described by a power law, and there is overall reasonable consistency between EDGE and HERACLES. Our measurements are also consistent with the resolved Molecular Gas Main Sequence relation (rMGMS, Σ_gas−Σ_⋆; Lin et al. 2019) found for EDGE-CALIFA galaxies by Barrera-Ballesteros et al. (2021). The bottom panel shows very good agreement between the EDGE and HERACLES results in the range $0.9\lesssim \mathrm{log}[{{\rm{\Sigma }}}_{\mathrm{gas}}]\lesssim 1.5;$ outside this range there are small differences, although there is still consistency within the error bars. Therefore, the discrepancies seen in the top panel are not the result of differences in efficiency at a given H₂-to-H_I ratio or gas surface density, but likely reflect small systematic differences in the relation between gas and stellar surface density in HERACLES and EDGE. Since we have both a broader morphological and a more numerous sample selection than HERACLES (particularly in the H_I-dominated regions), our results reflect on a more general power-law dependence of the SFE_gas on Σ_⋆. Observations have shown that the fraction of gas in the molecular phase in which star formation takes place depends on the pressure in the medium (Elmegreen 1993; Blitz & Rosolowsky 2006). These results suggest that high stellar densities in the inner regions of EDGE-CALIFA galaxies are helping self-gravity to compress the gas, resulting in H₂-dominated regions. Once the gas is predominantly molecular, our data suggest that a dependence of the SFE_gas on Σ_⋆ persists even in high-Σ_⋆, predominantly molecular regions.

Other studies have given different insights of the relation between star formation activity and the stellar surface density. For instance, analyzing 34 galaxies selected from the ALMA-MaNGA Quenching and STar formation (ALMaQUEST; Lin et al. 2019), Ellison et al. (2020) find that Σ_SFR is mainly regulated by Σ_mol, with a secondary dependence on Σ_⋆. Conversely, analyzing 39 galaxies selected from EDGE-CALIFA, Dey et al. (2019) find a strong correlation between Σ_SFR and Σ_mol; they show that the Σ_SFR − Σ_⋆ relation is statistically more significant. Sánchez et al. (2021), however, used the edge_pydb database to show that secondary correlations can be driven purely by errors in correlated parameters, and it is necessary to be particularly careful when studying these effects. Errors in Σ_gas, for example, will tend to flatten the relation between SFE_gas and Σ_gas because of the intrinsic correlations between the axes, and they will have the same effect on the relation between SFE_gas and Σ_* because of the positive correlation between Σ_* and Σ_gas.

4.2.3. SFE, Pressure, and SFR

We explore the dependency of SFE_gas on the dynamical equilibrium pressure, P_DE. While the midplane gas pressure, P_h (Elmegreen 1989), is a well-studied pressure prescription in a range of previous works (e.g., Elmegreen 1993; Leroy et al. 2008), P_DE has been extensively discussed recently (e.g., Kim et al. 2013; Herrera-Camus et al. 2017; Sun et al. 2020; Barrera-Ballesteros et al. 2021). In both pressure prescriptions, it is assumed that the gas disk scale height is much smaller than the stellar disk scale height and the gravitational influence from dark matter is neglected. P_h and P_DE have an almost equivalent formulation, although they slightly differ in the term related to the gravitational influence from the stellar component (second term in Equations (6) and (8); see Section 3.3). We quantify this difference by computing the mean P_DE-to-P_h ratio averaged in annuli for our sample, obtaining P_DE/P_h ≈ 1.51 ±0.19. We use this value to convert the P_h from HERACLES into P_DE, since we perform our qualitative analysis using the dynamical equilibrium pressure.

The top panel of Figure 9 shows the SFE_gas as a function of P_DE (in units of K cm⁻³). The slope of the SFE_gas versus P_DE relation (averaged over P_DE bins; black circles) has a break at $\mathrm{log}[{P}_{\mathrm{DE}}]\sim 3.7$ . Below $\mathrm{log}[{P}_{\mathrm{DE}}]\lesssim 3.7$ (i.e., where the ISM is HI dominated) we do not see a clear correlation between SFE_gas and P_DE. This is at the sensitivity limit existing data for EDGE, but it is also consistent with the overall behavior seen in HERACLES corresponding to a steepening of their mean relation. Above this pressure we find a clear linear trend in log–log space. For higher P_DE values (e.g., H₂-dominated regions) the EDGE average efficiencies are somewhat higher than those observed in HERACLES, which flatten out at high P_DE, although with a scatter that is within the respective 1σ error bars. For $\mathrm{log}[{P}_{\mathrm{DE}}]\gtrsim 3.7$ the EDGE average efficiencies are well described by the blue dashed line, which corresponds to 1% of the gas converted to stars per disk freefall time, τ_ff = (G ρ)^−1/2. To quantify this relation, we use an OLS linear bisector method to estimate the best linear fit to our data, obtaining

$\begin{eqnarray}\begin{array}{rcl}\mathrm{log}[{\mathrm{SFE}}_{\mathrm{gas}}({\mathrm{yr}}^{-1})] & = & [0.41\pm 0.29]\times \mathrm{log}[{P}_{\mathrm{DE}}/k({\rm{K}}\ {\mathrm{cm}}^{-3})]\\ & & -\ [11.32\pm 2.24].\end{array}\end{eqnarray} \tag{ 17 }$

The bottom panel of Figure 9 shows the Σ_SFR versus P_DE, color-coded by galactocentric radius. When compared with other recent measurements (e.g., KINGFISH, Herrera-Camus et al. 2017; PHANGS, Sun et al. 2020), our annuli have the advantage of covering a somewhat wider dynamic range in both Σ_SFR and P_DE. We find a strong correlation between Σ_SFR and P_DE that is approximately linear for annuli at $\mathrm{log}[{P}_{\mathrm{DE}}/k]\gtrsim 3.7$ , although below this limit we observe a break in the trend. As shown by the color-coding of the symbols, indicating r_gal in Figure 9, this limit is apparently related to the r_gal at which the transition from H₂-dominated to H i-dominated annuli happens. This transition may be due to the large range of physical properties covered by our sample, which span from molecular-dominated to atomic-dominated regimes. Where the ISM weight is higher (e.g., H₂-dominated regions), the SFR is stabilized by the increasing feedback from star formation to maintain the pressure that counteracts the P_DE (Sun et al. 2020). The lack of correlation we observe at $\mathrm{log}[{P}_{\mathrm{DE}}/k]\lesssim 3.7$ (r ≳ 0.7) is mainly because we are reaching our CO sensitivity in the H i-dominated regions. To quantify the correlation, we estimate the best linear fit by using an OLS linear bisector method in logarithmic space for annuli at r ≳ 0.7,

$\begin{eqnarray}\begin{array}{rcl}\mathrm{log}[{{\rm{\Sigma }}}_{\mathrm{SFR}}({M}_{\odot }\,{{yr}}^{-1})] & = & [1.10\pm 0.11]\times \mathrm{log}[{P}_{\mathrm{DE}}/k\,({\rm{K}}\,{\mathrm{cm}}^{-3})]\\ & & -\ [7.28\pm 0.65].\end{array}\end{eqnarray} \tag{ 18 }$

**Figure 9.** Top: SFE_gas as a function of dynamical equilibrium pressure, P_DE. The dashed blue line corresponds to 1% of gas converted to stars per disk freefall time. Bottom: SFR surface density, Σ_SFR, as a function of P_DE. The black dashed line is the OLS linear bisector fit for all points. The "r" term is the Pearson correlation coefficient of this subsample. The shaded region represents uncertainty of the slope derived from the OLS linear bisector fit. Conventions are as in Figure 8.
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Note that these results are potentially sensitive to the method we employ for the fitting. Nonetheless, using an orthogonal distance regression (ODR) to fit the same subsample, we obtain very comparable values $\mathrm{log}[{{\rm{\Sigma }}}_{\mathrm{SFR}}({M}_{\odot }\,{{yr}}^{-1})]$ $=[1.09\pm 0.05]\times \mathrm{log}[{P}_{\mathrm{DE}}/k$ (K cm⁻³)] − [7.25 ± 0.25]. Barrera-Ballesteros et al. (2021) analyze 4260 resolved star-forming regions of kiloparsec size located in 96 galaxies from the EDGE-CALIFA survey, using a similar sample selection (e.g., inclination, σ_gas, and Σ_atom constant values, among others), but they just consider equivalent widths for the Hα line emission EW(Hα) > 20 Å. Using an ODR fitting technique, they obtain $\mathrm{log}[{{\rm{\Sigma }}}_{\mathrm{SFR}}({M}_{\odot }\,{{yr}}^{-1})]=[0.97\pm 0.05]$ $\times \mathrm{log}[{P}_{\mathrm{DE}}/k\,({\rm{K}}\ {\mathrm{cm}}^{-3})]-[7.88\pm 0.48]$ , which is in agreement with the distribution shown in the bottom panel of Figure 9. The figure also shows that the correlation agrees with hydrodynamical simulations performed by Kim et al. (2013) (green dashed line), in which they obtain a slope of 1.13. These results are also consistent with measurements obtained in other galaxy samples. Sun et al. (2020) obtain a slope of 0.84 ± 0.01 for 28 well-resolved CO galaxies (∼1 farcs 5, corresponding to ∼100 pc) selected from the ALMA-PHANGS sample by using a methodology very similar to ours. Smaller slopes have been referenced in local very actively star-forming galaxies (e.g., local ultraluminous infrared galaxies, ULIRGs), which at the same time may resemble some of the conditions in high-redshift submillimeter galaxies (e.g., Ostriker & Shetty 2011). Herrera-Camus et al. (2017) analyzed the [CII] emission in atomic-dominated regions of 31 KINGFISH galaxies to determine the thermal pressure of the neutral gas and related it to P_DE, obtaining a slope of 1.3 (dotted blue line). Our results bridge these two extremes; the strong correlation between Σ_SFR and P_DE and its linearity support the idea of a feedback-regulated scenario, in which star formation feedback acts to restore balance in the star-forming region of the disk (Sun et al.2020).

4.2.4. SFE and Orbital Timescale

In the next two subsections, we exclude 21 galaxies (out of the 81) since their Hα rotation curves (taken from Levy et al. 2018) are either too noisy or not well fitted by the universal rotation curve parametric form. The top panel of Figure 10 shows SFE_gas versus τ_orb, the orbital timescale (in units of yr), color-coded by galactocentric radius. When analyzing our efficiencies averaged over orbital timescale bins (black symbols), we note that there is a slight flattening of the SFE_gas at $\mathrm{log}[{\tau }_{\mathrm{orb}}]\sim 7.9-8.1$ . We also note that annuli at $\mathrm{log}[{\tau }_{\mathrm{orb}}]\lesssim 8.1$ are usually within the bulge radius in the SDSS i band (reddish star symbols). However, the error bars are consistent with SFE_gas decreasing as a function of τ_orb, including at $\mathrm{log}[{\tau }_{\mathrm{orb}}]\lt 8.1$ . These results are in agreement with what is found in other spatially resolved galaxy samples (e.g., Wong & Blitz 2002; Leroy et al. 2008). The average gas depletion time for our subsample is ${\tau }_{\mathrm{dep}}={{\rm{\Sigma }}}_{\mathrm{gas}}/{{\rm{\Sigma }}}_{\mathrm{SFR}}\approx {2.8}_{-1.0}^{1.1}$ Gyr, which agrees fairly with the depletion time τ_dep = 2.2 Gyr found for HERACLES (not including early-type galaxies; Leroy et al. 2013). Utomo et al. (2017) computed the depletion times for 52 EDGE-CALIFA galaxies using annuli in the region within 0.7 r₂₅ (just considering the molecular gas); their average τ_dep ≈ 2.4 Gyr is in good agreement with our results.

**Figure 10.** Top: SFE_gas as a function of the orbital timescale, τ_orb. Color-coding and symbols are as described in Figure 8. The black dashed line is the best fit of the binned data and shows 5% of gas converted into stars per τ_orb. The "r" term represents the Pearson correlation coefficient, including the binned annuli, for the relation between the SFE_gas and τ_orb. Bottom: SFE_gas averaged over τ_orb bins over all galaxies of selected morphological types as in Figure 6. Black dashed lines, from top to bottom, represent the 50%, 17%, 5%, 1.7%, and 0.5% efficiency of gas converted into stars per τ_orb.
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The orbital timescale has a strong correlation with radius, and theoretical arguments expect SFE_gas to be closely related to orbital timescale in typical disks (Silk 1997; Elmegreen 1997; Kennicutt 1998). A correlation between SFE_gas and τ_orb is based on the "Silk−Elmegreen" relation, which states that Σ_SFR = _orb Σ_gas/τ_orb, where _orb is the fraction of the gas converted into stars per orbital time (also called "orbital efficiency"). Therefore, because SFE_gas = Σ_SFR/Σ_gas, SFE_gas and τ_orb are related by

$\begin{eqnarray}&&{\mathrm{SFE}}_{\mathrm{gas}}=\displaystyle \frac{{\epsilon }_{\mathrm{orb}}}{{\tau }_{\mathrm{orb}}}.\end{eqnarray} \tag{ 19 }$

It is interesting to analyze the relations between the different timescales since they can give intuition about the physical processes underlying the star formation activity (e.g., Semenov et al. 2017; Colombo et al. 2018). Equation (19) shows that the timescale to deplete the gas reservoir and the orbital timescale are related through _orb. Although there is large scatter, the median values of τ_orb and τ_dep for our sample are $({2.0}_{-0.7}^{+0.9})\times {10}^{8}$ yr and $({2.8}_{-1.0}^{+1.1})\times {10}^{9}$ yr, respectively. These values are in good agreement with previous EDGE-CALIFA sample results found by Colombo et al. (2018), who analyze a more limited subsample of 39 galaxies without the benefit of CO line stacking and more constrained to inclination below 65°, with ${\tau }_{\mathrm{orb}}=({3.2}_{-1.2}^{+2.0})\times {10}^{8}$ yr and ${\tau }_{\mathrm{dep}}=({2.8}_{-1.2}^{+2.3})\times {10}^{9}$ yr. The black dashed line in the top panel of Figure 10 corresponds to the best fit to our binned data (black symbols); our fit excludes lower limits (shown as triangles in the figure), and it shows that _orb ≈ 5% of the total gas mass is converted to stars per τ_orb. This average efficiency is lower than but similar to the _orb ≈ 7% of efficiency found by Wong & Blitz (2002) and Kennicutt (1998) and the _orb ≈ 6% efficiency for HERACLES (Leroy et al. 2008). Also, this efficiency is the same as the average molecular gas orbital efficiency found by Colombo et al. (2018) for their subsample of EDGE-CALIFA galaxies (_orb ≈ 5%). Similar to our results, all of these studies did not find a clear correlation between SFE_gas and τ_orb in the inner regions of disks, where the ISM is mostly molecular.

Like Colombo et al. (2018), however, we find that a constant _orb is not a good approximation for the data. The efficiency per orbital time depends on the Hubble morphological type, with _orb increasing from early to late types. This is shown in the bottom panel of Figure 10, which shows the data grouped according to the same four morphological classes used in Figure 6. Our results show that annuli from Sbc, Sc, and Scd galaxies, which are the most numerous in our sample, seem to group around _orb ∼ 5%. This value is also representative of the typical _orb seen for the morphological bins composed by Sa—Sd and Sdm—Ir types in the range $8.0\lt \mathrm{log}[{\tau }_{\mathrm{orb}}]\lt 8.4$ . However, these groups also show _orb ≲ 5% in the ranges $\mathrm{log}[{\tau }_{\mathrm{orb}}]\lt 8.0$ and $\mathrm{log}[{\tau }_{\mathrm{orb}}]\gt 8.4$ . However, early-type galaxies (with admittedly limited statistics, 21 annuli in total) show substantially lower _orb, with a median of _orb = 1.2%. These values are in agreement with previous results for EDGE-CALIFA galaxies by Colombo et al. (2018), even though sample selection and processing were different. They observe an _orb ∼ 10% for Sbc galaxies (most numerous in their subsample) and a systematic decrease in orbital efficiencies from late- to early-type galaxies.

As concluded in Colombo et al. (2018), our results support the idea of a nonuniversal efficiency per orbit for the "Silk−Elmegreen" law. Figure 10 shows that not only does _orb depend on morphological type, but the behavior also varies with galactocentric radius: at short orbital timescales ( $\mathrm{log}[{\tau }_{\mathrm{orb}}]\lesssim 8.3$ ), or small radii ( $\mathrm{log}[r/{R}_{{\rm{e}}}]\lesssim 1.1-1.3$ ), the efficiency per unit time SFE_gas tends to be constant, and as a consequence, the observed _orb tends to systematically decrease as τ_orb decreases. This is best seen in the top panel in the departure of the binned data (black symbols) from the dashed line of constant _orb. Note that this is also the approximate radius of the molecular disk, the region where molecular gas dominates the gaseous disk (Figure 5).

Other studies have also reported SFE_gas deviations as a function of morphology. Koyama et al. (2019) analyze CO observations of 28 nearby galaxies to compute the C-index = R90_petro,r/R50_petro,r as an indicator of the bulge dominance in galaxies (where R90_petro,r and R50_petro,r are the radius containing 90% and 50% of the Petrosian flux for SDSS r-band photometric data, respectively). Although they do not detect a significant difference in the SFE_gas for bulge- and disk-dominated galaxies, they identify some CO-undetected bulge-dominated galaxies with unusually high SFE_gas values. Their results may reflect the galaxy population during the star formation quenching processes caused by the presence of a bulge component, and they could explain the flattening shown in the top panel (mostly dominated by annuli within bulges) and bottom panel (mainly due to early-type and Sb−Scd galaxies' annuli) of Figure 10.

4.2.5. Gravitational Instabilities

The formulation of the Toomre Q gravitational stability parameter (Toomre 1964, see Section 3.3 for more details) provided a useful tool to quantify the stability of a thin disk disturbed by axisymmetric perturbations. Some studies have shown that the star formation activity is widespread where the gas disk is Q-unstable against large-scale collapse (e.g., Kennicutt 1989; Martin & Kennicutt 2001).

First, we examine the case where only gas gravity is considered; the top left panel of Figure 11 considers this case, showing the SFE_gas as a function of both the Toomre instability parameter for a thin disk of gas (x-bottom axis), Q_gas, and galactocentric radius (indicated by circle color). The vertical black dashed line marks the limit where the gas becomes unstable to axisymmetric collapse. The vast majority of our points are in stable (or marginally stable) annuli with an average Q_gas = 3.2. There is no apparent correlation of SFE_gas with Q_gas (Pearson correlation coefficient of 0.17), and that is independent of galaxy mass (middle left panel) or type (bottom left panel). In other words, SFE_gas does not decrease as stability increases (i.e., as Q_gas increases). This is in agreement with similar results reported in previous studies. For example, using H_I observation for 20 dwarf irregular galaxies selected from the Local Irregulars That Trace Luminosity Extremes, The H_I Nearby Galaxy Survey (LITTLE THINGS; Hunter et al. 2012), Elmegreen & Hunter (2015) find that dIrr galaxies are Q_gas-stable, with a mean Q_gas ∼ 4. They also find that their galaxies have relatively thick disks, with typical (atomic) gas scale heights of h_gas ∼ 0.3 − 1.5 kpc. Consequently, they are more stable than the infinitely thin disks for which the Q_gas = 1 criterion is derived.

**Figure 11.** SFE_gas as a function of Toomre's gravitational instability Q parameter for two different scenarios. Left: the SFE_gas is plotted as a function of the Toomre Q parameter for gas, Q_gas. Right: the SFE_gas is plotted as a function of the Toomre Q parameter redefined by Rafikov (2001) to include the contribution of stars and gas, Q_stars+gas. Green squares in the top left and right panels correspond to HERACLES spiral galaxies; the black dashed line sets the limit where the gas is unstable or stable. The middle left and right panels show the same points included in the top panels, but this time divided into low and high galaxy stellar mass sets; red points correspond to binned annuli that belong to galaxies with log₁₀(M_⋆) > 10.7, while blue points belong to galaxies with stellar masses below this limit. Blue and red contours are the 66% and 33% of the points for each mass set, respectively. The bottom left and right panels provide information about the morphological type of the host galaxy for a given annulus. The crosses correspond to the center of mass of the log₁₀SFE_gas vs. center of mass of ${\mathrm{log}}_{10}Q$ points for each set of morphological types.
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Stars represent the dominant fraction of mass in disks at galactocentric radii with active star formation. Thus, it makes sense to account for their gravity when determining the stability of the ISM in these regions. The top right panel of Figure 11 shows the SFE_gas as a function of Toomre's instability parameter modified by Rafikov (2001) to include the effects of both gas and stars, Q_stars+gas; again galactocentric radius is indicated by color. As expected, we find that disks become more unstable when stellar gravity is included in addition to gas, with a few points appearing in the nominally unstable region for thin disks. The bulk of the annuli, however, are found at around Q_stars+gas ≈ 1.6. This is roughly consistent with calculations of Q in other samples (Romeo 2020). There is, however, no correlation of SFE_gas with Q.

The middle panels of Figure 11 show the SFE_gas values versus Q_gas and Q_stars+gas, but this time splitting the points into two groups of different galaxy stellar mass; as in Section 4.2.1, we choose log₁₀[M_⋆] = 10.7 to split the groups. Although the two groups separate in Q_gas, with annuli from galaxies with log₁₀[M_⋆] < 10.7 tending to be in general more stable, the separation disappears once the stars are taken into account in the Q calculation.

In one of the ideas on how stars relate to SFE_gas, Dib et al. (2017) show that star formation may be associated with the fastest-growing mode of instabilities. In that case, the relation between SFR and gas in spiral galaxies may be modulated by the stellar mass, which will contribute to the gravitational instability and regulation of star formation (like in the case of NGC 628; Dib et al. 2017). Also, the ${{\rm{\Sigma }}}_{{\mathrm{SFE}}_{\mathrm{gas}}}$ −Σ_⋆ relation, known as the "extended Schmidt law," suggests a critical role for existing stellar populations in ongoing star formation activity, and it may be a manifestation of more complex physics where Σ_⋆ is a proxy for other variables or processes (Shi et al. 2011). Our results may reflect the importance of instabilities in enhancing the SFE_gas due to the strong gravitational influence from stars, particularly in galaxies with log₁₀[M_⋆] > 10.7. But in the aggregate there is no apparent evidence for a trend showing that annuli with more unstable Q have higher star formation efficiencies.

The bottom panels of Figure 11 show the same relations as the top panels, but this time the data are grouped in four bins by morphological type. In both panels crosses correspond to the "center of mass" for each morphological group. Although annuli in early-type galaxies are more "Toomre stable," the statistics are very sparse and the Toomre calculation may not apply (since these are not thin disks). Otherwise, we do not find a clear trend between morphology and stability based on the Toomre parameter for stars and gas. Previous studies have reported that Q_star+gas increases toward the central parts of spirals. For example, Leroy et al. (2008) found that although molecular gas is the dominant component of the ISM in the central regions, HERACLES galaxies seem to be more stable there than near the H₂-to-H_I transition. If the type of gravitational instability that Q is sensitive to plays a role in star formation in galaxies, we would expect to see some links between Q and molecular gas abundance. It is therefore interesting to test whether there is dependence of the H₂-to-H_I ratio, R_mol = Σ_mol/Σ_atom, on the degree of gravitational instability in EDGE galaxies. Since we assume a constant Σ_atom, however, for us R_mol is simply a normalized molecular gas surface density, Σ_mol. We use the typical H₂-to-H_I transition radius found in Section 4.2.1 to split the annuli into three groups: (i) annuli at r < 0.3r₂₅ (r < 0.6R_e; red points), which should be strongly molecular; (ii) annuli between 0.3r₂₅ < r and r < 0.5r₂₅ (0.6R_e < r < 1.4R_e; yellow points), which should be around the molecular to atomic transition region; and (iii) annuli at r > 0.5r₂₅ (r > 1.4R_e; blue points), which should be dominated by atomic gas. The top panel of Figure 12 shows that Σ_mol has a large scatter and does not seem to depend strongly on Q_star+gas. Within each range, however, we find that annuli with smaller galactocentric radii tend to be slightly more stable.

**Figure 12.** Top: molecular gas surface density, Σ_mol, as a function of Toomre's instability parameter for gas and stars, Q_stars+gas, for annuli with galactocentric radii within 0.3r₂₅ (red points), between 0.3r₂₅ and 0.5r₂₅ (yellow points), and outside 0.5r₂₅ (blue points). Each point represents the value of Σ_mol averaged over an r/r₂₅-wide annuli. Points are color-coded by galactocentric radius (in r₂₅), as indicated by the color bar on the right side. Solid lines are PCA major and minor axes for which each of the groups varies most. The axes are normalized to fit the major and minor axes of the elliptical contours that enclose 50% of the annuli within a given range. The ratio between the major and the minor axes from the PCA, ${R}_{\mathrm{maj}/\min }={r}_{\mathrm{maj}}/{r}_{\min }$ , is in the upper left. Typical 1σ error bars are shown in the lower left. The horizontal black dotted line represents the assumed Σ_atom = 6 M_⊙ pc⁻². Bottom: distribution of the Spearman rank correlation coefficients for the three r ranges in the top panel after randomizing the Σ_mol data, per range, in 200 realizations to test for the degree of internal correlation of the axes. The horizontal dashed red, dashed yellow, and dashed blue lines are the Spearman rank coefficients for the actual data, from inner to outer ranges, respectively. This shows that the correlations observed in the top panel are completely consistent with being a result of the definition of Q_gas+stars (see discussion in the text) and thus (although tantalizing) are not particularly meaningful.
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**Figure 12.** Top: molecular gas surface density, Σ_mol, as a function of Toomre's instability parameter for gas and stars, Q_stars+gas, for annuli with galactocentric radii within 0.3r₂₅ (red points), between 0.3r₂₅ and 0.5r₂₅ (yellow points), and outside 0.5r₂₅ (blue points). Each point represents the value of Σ_mol averaged over an r/r₂₅-wide annuli. Points are color-coded by galactocentric radius (in r₂₅), as indicated by the color bar on the right side. Solid lines are PCA major and minor axes for which each of the groups varies most. The axes are normalized to fit the major and minor axes of the elliptical contours that enclose 50% of the annuli within a given range. The ratio between the major and the minor axes from the PCA, ${R}_{\mathrm{maj}/\min }={r}_{\mathrm{maj}}/{r}_{\min }$ , is in the upper left. Typical 1σ error bars are shown in the lower left. The horizontal black dotted line represents the assumed Σ_atom = 6 M_⊙ pc⁻². Bottom: distribution of the Spearman rank correlation coefficients for the three r ranges in the top panel after randomizing the Σ_mol data, per range, in 200 realizations to test for the degree of internal correlation of the axes. The horizontal dashed red, dashed yellow, and dashed blue lines are the Spearman rank coefficients for the actual data, from inner to outer ranges, respectively. This shows that the correlations observed in the top panel are completely consistent with being a result of the definition of Q_gas+stars (see discussion in the text) and thus (although tantalizing) are not particularly meaningful.
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A suggestive trend emerges when we limit the range of galactocentric radii. We compute a principal component analysis (PCA; Pearson 1901) to find the main axis along which the three populations vary most. The top panel of Figure 12 shows the PCA major and minor axis for annuli in the three defined zones. The axes have been normalized to fit the minor or major axes of the elliptical contours that enclose 50% of the annuli over a given range. The figure suggests that, within a given range, we tend to find more plentiful molecular gas in regions where annuli are more Toomre unstable. A concern, however, is that the axes in this plot have a degree of intrinsic correlation since the computation of Q_star+gas includes Σ_mol. Therefore, to assert that the correlation we observe is physically meaningful, we need to show that it is stronger than that imposed by the mathematics of the computation. We quantify the strength of the correlations using the Spearman rank correlation coefficient, which is a nonparametric measure of the monotonicity of the observed correlations. To investigate the degree to which the axes are internally correlated, we randomize the Σ_mol data (within each range) and recompute Q_star+gas in 200 realizations, to obtain the distributions of the Spearman rank correlation coefficient for each randomized group. Clearly, in the randomized data we would expect only the degree of correlation caused by the mathematical definition of the quantities. The bottom panel of Figure 12 shows that the Spearman rank correlation coefficients for the actual data (dashed red, dashed yellow, and dashed blue vertical lines) are consistent with the distributions seen in the randomized histograms. These results suggest that the correlation between Σ_mol and Q_star+gas seen in the top panel of Figure 12 is purely driven by the implementation of Equation (14), in which Q_star+gas depends on Σ_mol.

5. Summary and Conclusions

We present a systematic study of the star formation efficiency and its dependence on other physical parameters in 81 galaxies from the EDGE-CALIFA survey. We analyze CO 1–0 data cubes that have 7'' angular resolution and 20 km s⁻¹ channel width, along with Hα velocities extracted from the EDGE database, edge_pydb (T. Wong et al., in preparation). We implement a spectral stacking procedure for CO spectra shifted to the Hα velocity to enable detection of faint emission and obtain surface densities averaged over annuli of width 0.1r₂₅ (∼3 farcs 5), and we measure Σ_mol out to typical galactocentric radii of r ≈ 1.2 r₂₅ (r ∼ 3 R_e). We assume a constant (Walter et al. 2008), a Milky Way constant conversion factor of α_CO = 4.3 M_⊙ ${[{\rm{K}}\,\mathrm{km}\,{{\rm{s}}}^{-1}\,{\mathrm{pc}}^{-2}]}^{-1}$ , and a constant σ_g = 11 km s⁻¹ (Leroy et al. 2008; Tamburro et al. 2009). We perform a systematic analysis to explore molecular scale lengths and the dependence of the star formation efficiency SFE_gas = Σ_SFR/(Σ_mol + Σ_atom) on various physical parameters. Our main conclusions are as follows:

1.
We determine the molecular and stellar exponential disk scale lengths, l_mol and l_⋆, by fitting the radial Σ_mol and Σ_⋆ profiles, respectively. We also obtain the radii that enclose 50% of the total molecular mass, R_50,mol, and stellar mass, R_50,⋆ (see Figure 3). To quantify the relations, we use an OLS linear bisector method to fit all our 3σ detections beyond r > 1.5 kpc. We find that l_mol = [0.86 ± 0.07] × l_⋆, l_mol =[0.24 ± 0.01] × r₂₅, and R_50,mol = [0.93 ± 0.05] × R_50,⋆. These results are in agreement with values from the current literature and indicate that on average the molecular and stellar radial profiles are similar.
2.
We find that on average the SFE_gas exhibits a smooth exponential decline as a function of galactocentric radius, without a flattening toward the centers of galaxies seen in some previous studies (see Figure 6), in agreement with recent results (e.g., Sánchez 2020; Sanchez et al. 2020). We note a systematic increase in the average SFE_gas from early- to late-type galaxies. In H i-dominated regions, this conclusion depends strongly on our assumption of a constant H i surface density for the atomic disk. The EDGE-CALIFA survey encompasses a galaxy sample that has not been well represented by prior studies, which includes a larger number of galaxies with a broader range of properties and morphological types. This may explain the differences we observe when we compare our result with previous work.
3.
The SFE_gas has a clear dependence on Σ_⋆ (see Figure 8), a relation that holds for both the atomic-dominated and the molecular-dominated regimes. The SFE_gas has a comparatively flatter dependence on Σ_gas for high values of the gas surface density. This suggests that the stellar component has a strong effect on setting the gravitational conditions to enhance the star formation activity, not just converting the gas from H i to H₂. However, statistical tests, which are beyond the scope of this work, may be required to demonstrate that this secondary relation is not induced by errors (Sánchez et al. 2021).
4.
There is a clear relationship between SFE_gas and the dynamical equilibrium pressure, P_DE, particularly in the innermost regions of galactic disks. Moreover, we find a strong correlation between Σ_SFR and P_DE. We identify a transition at $\mathrm{log}[{P}_{\mathrm{DE}}/k({\rm{K}}\,{\mathrm{cm}}^{-3})]$ ∼ 3.7, above which we find a best-linear-fit slope of 1.11 ± 0.15. Our results are in good agreement with the current literature and support a self-regulated scenario in which the star formation acts to restore the pressure balance in active star-forming regions.
5.
We find a power-law decrease of SFE_gas as a function of orbital time τ_orb (see Figure 10). The average τ_orb within 0.7r₂₅ for our galaxies is 2.6 ± 0.2 Gyr, with a typical efficiency for converting gas into stars of ∼ 5% per orbit. Note, however, that there are systematic trends in this efficiency. In particular, we note that there is a flattening of the SFE_gas for $\mathrm{log}[{\tau }_{\mathrm{orb}}(\mathrm{yr})]\sim 7.9-8.1$ that may reflect star formation quenching due to the presence of a bulge component. Although our methodology is different, our findings support the conclusion that the star formation efficiency per orbital time is a function of morphology (Colombo et al. 2018).
6.
Finally, under the assumption of a constant velocity dispersion for the gas, we do not find clear correlations between the SFE_gas and Q_gas or Q_stars+gas. It is possible that larger samples of galaxies may be required to confidently rule out any trends. Our typical annulus has Q_stars+gas ∼ 1.6, independent of galaxy mass or morphological type. The range of Σ_mol is very broad, and we do not find any meaningful trends.

Future VLA H i and ALMA CO data may improve the spatial coverage and sensitivity, allowing us to remove some limitations and extend this analysis to fainter sources (e.g., earlier galaxy types), contributing to a more extensive and representative sample of the local universe.

V.V. acknowledges support from the scholarship ANID-FULBRIGHT BIO 2016-56160020 and funding from NRAO Student Observing Support (SOS) - SOSPA7-014. A.D.B., S.V., R.C.L., and V.V. acknowledge partial support from NSF-AST1615960. J.B.-B. acknowledges support from the grant IA-100420 (DGAPA-PAPIIT, UNAM) and funding from the CONACYT grant CF19-39578. R.H.-C. acknowledges support from the Max Planck Society under the Partner Group project "The Baryon Cycle in Galaxies" between the Max Planck for Extraterrestrial Physics and the Universidad de Concepción. Support for CARMA construction was derived from the Gordon and Betty Moore Foundation; the Kenneth T. and Eileen L. Norris Foundation; the James S. McDonnell Foundation; the Associates of the California Institute of Technology; the University of Chicago; the states of California, Illinois, and Maryland; and the NSF. CARMA development and operations were supported by the NSF under a cooperative agreement and by the CARMA partner universities. This research is based on observations collected at the Centro Astronómico Hispano-Alemán (CAHA) at Calar Alto, operated jointly by the Max-Planck Institut für Astronomie (MPA) and the Instituto de Astrofisica de Andalucia (CSIC). M.R. acknowledges support from ANID(CHILE) Fondecyt grant No. 1190684 and partial support from ANID project Basal AFB-170002. AST-1616199 for Illinois (TW/YC/YL) and AST-1616924 for Berkeley (LB/DU). This research has made use of NASA's Astrophysics Data System.

Software: Astropy (Astropy Collaboration et al. 2018), MatPlotLib (Hunter 2007), NumPy (Harris et al. 2020), SciPy (Virtanen et al. 2020), seaborn (Waskom 2021), Scikit-learn (Pedregosa et al. 2011).

The EDGE-CALIFA Survey: The Resolved Star Formation Efficiency and Local Physical Conditions

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ORCID iDs

Dates

Abstract

1. Introduction

2. Data Products

2.1. The EDGE and CALIFA Surveys

2.2. `edge`_`pydb` Database

3. Methods

3.1. Stacking of the CO Spectra

3.2. Extracting Fluxes from Stacked Spectra

3.3. Basic Equations and Assumptions

4. Results and Discussion

4.1. Exponential Scale Lengths

4.2. SFE and Local Parameters

4.2.1. SFE and Galactocentric Radius

4.2.2. SFE versus Stellar and Gas Surface Density

4.2.3. SFE, Pressure, and SFR

4.2.4. SFE and Orbital Timescale

4.2.5. Gravitational Instabilities

5. Summary and Conclusions

Footnotes

The EDGE-CALIFA Survey: The Resolved Star Formation Efficiency and Local Physical Conditions

Article metrics

Permissions

Share this article

Author e-mails

Author affiliations

ORCID iDs

Dates

Abstract

1. Introduction

2. Data Products

2.1. The EDGE and CALIFA Surveys

2.2. edge_pydb Database

3. Methods

3.1. Stacking of the CO Spectra

3.2. Extracting Fluxes from Stacked Spectra

3.3. Basic Equations and Assumptions

4. Results and Discussion

4.1. Exponential Scale Lengths

4.2. SFE and Local Parameters

4.2.1. SFE and Galactocentric Radius

4.2.2. SFE versus Stellar and Gas Surface Density

4.2.3. SFE, Pressure, and SFR

4.2.4. SFE and Orbital Timescale

4.2.5. Gravitational Instabilities

5. Summary and Conclusions

Footnotes

2.2. `edge`_`pydb` Database