2.1. Divertor power exhaust

The amount of conducted power crossing the last closed flux surface (LCFS) and entering the SOL is denoted as ${P_{\textrm{SOL}}}$. It is calculated as the sum of power from auxiliary (11.1 MW), ohmic (1.7 MW) and alpha heating (~20–28 MW) less the core radiated power (~10.4–13.2 MW). Estimates of core plasma impurity content assumed in zero-dimensional (0-D) calculations by Creely et al. (Reference Creely, Greenwald, Ballinger, Brunner, Canik, Doody, Fülöp, Garnier, Granetz and Gray2020), predict 29 MW of conducted power through the LCFS, whereas 1.5-D time-dependent core modelling simulations by Rodriguez-Fernandez et al. (Reference Rodriguez-Fernandez, Howard, Greenwald, Creely, Hughes, Wright, Holland, Lin and Sciortino2020), using different physics models and slightly different assumptions about impurities, yield P _SOL = 19–21 MW, owing to reduced fusion power predictions and increased core radiation. Although the core impurity assumptions used are based on the existing tokamak database, they have wide uncertainties. Therefore, for the design of the divertor targets, ${P_{\textrm{SOL}}} = 29\;\textrm{MW}$, is assumed as the upper limit. Although some of the power flowing into the SOL will flow across SOL flux surfaces to the main chamber limiter surfaces, or radiated in the main chamber SOL, we ignore these loss channels and make the conservative assumption that all power goes to the divertors. As maintaining perfect double-null power sharing during a discharge will likely be challenging with the narrow SOL in SPARC, each set of divertors (upper and lower) will be designed to handle the full ${P_{\textrm{SOL}}}$ and no benefits from double-null power sharing is assumed. In single-null scenario ELM-suppressed EDA H-modes, the power sharing between the inner and outer divertor has been measured in Alcator C-Mod to be approximately 40 : 60 (Brunner et al. Reference Brunner, Kuang, LaBombard and Terry2018a). In comparison, measurements of MAST for single-null H-mode discharges with off-axis neutral beam heating recorded the inter-ELM integrated energy to the outer divertor to be 6.5 times higher than at the inner divertor. The ELM integrated energy deposition was found to be approximately three times higher on the outer divertor (De Temmerman et al. Reference De Temmerman, Kirk, Nardon and Tamain2011). This suggests that the inter-ELM divertor IN:OUT sharing is approximately 15 : 85 and, for the ELMs, 25 : 75. Owing to the large uncertainty in these measurements, 40 % of ${P_{\textrm{SOL}}}$ is assumed to go to the inner divertor and 70 % to the outer divertor, an additional 10 % power has been included to provide some margin. Thus, the inner divertors on SPARC are being designed to exhaust 11.6 MW and the outer divertor 20.3 MW for a 10 s pulse.

2.2. SOL heat flux width

To convert the power to the divertors into a surface heat flux, a key unknown quantity is the level of cross-field energy transport in the SOL. Without a validated model to make predictions, empirical and heuristic scalings for the heat flux e-folding width $({\lambda _q})$ are used for the design of SPARC. Table 2 summarizes the projections for the heat flux width mapped to the outer mid-plane (OMP) based on a set of recent scalings. The calculations are based on the parameters listed in table 1. However, some additional assumptions are required: the poloidal magnetic field at the outer midplane derived from the magnetic equilibrium of the primary reference discharge is 2.83 T; the core plasma volume average ion temperature is assumed equal to ${T_e}$; the edge ${Z_{\textrm{eff}}}$ is assumed to be the same as the core; the separatrix density $({n_{e,\textrm{sep}}})$ for a H-mode is assumed equal to ${n_e}/3$ (Kukushkin et al. Reference Kukushkin, Janeschitz, Loarte, Pacher, Coster, Reiter and Schneider2001); and the separatrix temperature $({T_{e,\textrm{sep}}})$ is calculated iteratively assuming classical Spitzer–Harm conduction (Stangeby Reference Stangeby2000). Despite the significant uncertainty associated with the scalings and the assumptions needed, it is reassuring that they all predict the heat flux width in SPARC to within a factor of 2.5 of each other, which increases our confidence in the extrapolation. However, to be conservative, the narrowest heat flux width of 0.18 mm is assumed for the SPARC design. The two-dimensional (2-D) modelling studies discussed in § 4 adjust cross-field transport coefficients so as to match this target value of ${\lambda _q}$.

Table 2. Projections for the heat flux width mapped to the OMP in SPARC V2. Note that for Eich et al. (Reference Eich, Manz, Goldston, Hennequin, David, Faitsch, Kurzan, Sieglin and Wolfrum2020), the dimensionally correct regression is used.

2.3. Divertor radiation fraction

As mentioned in the introduction, access to dissipative divertor regimes in SPARC is difficult to predict. One method is to make use of the simple 1-D models developed by Reinke (Reference Reinke2017) and Goldston, Reinke & Schwartz (Reference Goldston, Reinke and Schwartz2017) to examine the scaling for the impurity fraction needed to achieve detached divertor conditions with tokamak operating parameters (e.g. magnetic field, size). Recent experiment results from JET and ASDEX Upgrade have found that the nitrogen fractions needed to maintain detached divertor conditions in a power scan roughly agree with these scaling law predictions (Henderson et al. Reference Henderson, Bernert, Brezinsek, Carr, Cavedon, Dux, Gahle, Harrison, Kallenbach and Lipschultz2019), although the absolute magnitudes are still uncertain. Reinke (Reference Reinke2017) estimates that to reach divertor target ion temperatures of 5 eV, a proxy for divertor detachment, a nitrogen impurity fraction of 11.4 % is needed in a 1.65 m major radius, 12.0 T device that is running at a Greenwald fraction of 0.8. Scaling to SPARC V2 with ${B_0}$, ${R_0}$ and ${f_{\textrm{GW}}}$ takes this up to a 33.5 % nitrogen impurity fraction and 11.5 % for neon. Such high-impurity fractions in the divertor will likely result in significant core contamination and affect fusion performance. As the design is currently focused on the primary reference discharge and it is unclear whether such a high-impurity fraction will be tolerable for the core plasma, rather than aim for ~100 % radiation fraction leading to detached or near-detached conditions, a moderate 50 % radiation fraction is assumed for baseline design scenario of SPARC V2. As 2-D SOL simulations become more mature, the specification for the radiation fraction will be revisited.

It is important to note that a 50 % divertor radiation fraction is not necessarily conservative, however, there are some mitigating factors that can used during SPARC operations to ensure divertor target survivability while still meeting the primary mission of Q > 2. The high-impurity fraction calculated for SPARC V2 based on the scaling by Reinke (Reference Reinke2017) is largely due the low target ${f_{\textrm{GW}}}$, and the assumed ratio of ${n_{e,\textrm{sep}}}$ to the pedestal density $({n_{e,\textrm{ped}}})$. The former is a result of an administrative fusion power limit whereas the latter is driven by a desire to maximize pedestal performance. The current primary operating point is chosen to maximize fusion gain while limiting the total fusion power (Creely et al. Reference Creely, Greenwald, Ballinger, Brunner, Canik, Doody, Fülöp, Garnier, Granetz and Gray2020), but there exists a relatively large operational window that can meet the primary mission of SPARC (Q > 2) at higher ${f_{\textrm{GW}}}$. Note, however, that the plasmas at higher ${f_{\textrm{GW}}}$ would have to be run ‘lean’ with a higher deuterium-to-tritium ratio (or larger impurity dilution) in order to keep within the fusion power limits. Similarly, the assumed ratio of ${n_{e,\textrm{sep}}}$ to ${n_{e,\textrm{ped}}}$ can be increased, but at fixed ${f_{\textrm{GW}}}$, would imply reducing the pedestal pressure, likely reducing Q from the primary reference discharge. As the primary reference discharge projects to Q = 11, some reduction in core plasma performance is tolerable while still allowing SPARC to achieve its primary mission target of Q > 2.

2.4. Divertor target geometry

The divertor target geometry must be designed to fulfil a number of roles: the target plates have to be shaped to maximize the surface area swept out by the strike point sweep (figure 1a) while at the same time ensuring that sufficient divertor volume is allocated for the XPT configuration (figure 1b). The divertor outline as shown in figure 1 is an approximate outline designed to meet these requirements. The features shown in the outer divertor are a result of combining the swept heat flux mission and the XPT divertor mission. Only during XPT operation is the outer strike point intended to intersect with the vertical and horizontal faces at larger major radius. The sweeping, outside of XPT operation, will be controlled to ensure that the strike point is kept on the angled, high heat flux surfaces highlighted in pink. The development of this divertor outline is in progress as considerations have yet to be made for disruption forces, installation, assembly, and maintenance. Furthermore, it has yet to be assessed how much space is required for the secondary X-point of the XPT divertor, which will be determined from an assessment of the diagnostic needs as well as simulations of the XPT divertor. Therefore, the divertor geometry will continue to evolve as the design and analysis of the SPARC divertor progresses.

The current divertor geometry shown in figure 1 allows for the inner divertor strike point to be swept over a target surface poloidal arc length of 0.3 m, corresponding to an area of ~2.6 m². During the same sweep process the outer divertor strike point sweeps out a poloidal arc length of 0.4 m, corresponding to an area of ~4.5 m². In addition, the magnetic field line surface incident angle varies across the high heat flux surfaces as the strike point is swept, but stays below $1\mathrm{^\circ }$, assuming a perfectly axisymmetric target. However, machining and installation tolerances along with the needed chamfering of tile edges will increase the incident field line angle. Owing to this, ‘fish-scaling’ of the divertor tiles may be necessary to protect adjacent tiles, as was done for ITER (Pitts et al. Reference Pitts, Bardin, Bazylev, van den Berg, Bunting, Carpentier- Chouchana, Coenen, Dejarnac and Escourbiac2017), where each tile surface is tilted by $1\mathrm{^\circ }$. Therefore, to be conservative, an incident field line angle of $2\mathrm{^\circ }$ is assumed for the SPARC V2 divertor thermal analysis; this will be reassessed as a more detailed design is produced.

2.5. Divertor target heat flux profile

To estimate the divertor target heat flux profile, the SPARC V2 primary reference discharge magnetic equilibrium is used to calculate the flux expansion to the divertor target. The divertor target surface plasma heat flux profile is approximated using the Eich et al. (Reference Eich, Sieglin, Scarabosio, Fundamenski, Goldston and Herrmann2011a) profile of an exponential function convoluted with a Gaussian function of width S, where the multi-machine H-mode database suggests that $S\sim {\lambda _q}/2$ (Eich et al. Reference Eich, Leonard, Pitts, Fundamenski, Goldston, Gray, Herrmann, Kirk, Kallenbach and Kardaun2013). Owing to divertor and SOL radiation, the total integrated power due to incident plasma heat flux profiles is less than ${P_{\textrm{SOL}}}$, reducing the peak heat fluxes. Experimentally, as the radiation fraction increases and divertor plasma temperatures decrease, a broadening of the plasma heat flux profile is also observed (Kallenbach et al. Reference Kallenbach, Bernert, Beurskens, Casali, Dunne, Eich, Giannone, Herrmann, Maraschek and Potzel2015), which should further reduce the peak; however, as the exact scaling is unclear, these additional effects are not included.

Owing to the enclosed divertor geometry, the majority of the divertor radiation will be deposited on the divertor target surfaces. The radiation heat flux profile across the divertor target is dependent on the source locations and is difficult to predict for SPARC at present. Instead, for simplicity, the divertor radiated power is simply added to the plasma heat flux profile as a constant uniform background heat flux term, similar to that used in the multi-machine H-mode database study (Eich et al. Reference Eich, Leonard, Pitts, Fundamenski, Goldston, Gray, Herrmann, Kirk, Kallenbach and Kardaun2013), to obtain the total surface heat flux profile. While this uniform background is much smaller, it is being applied continuously compared with the transient sweeping of the high heat flux feat and still plays a role in assessing the divertor survivability. Thus, total integrated power from the plasma heat flux profiles and the uniform radiation term across the entire divertor target surface is taken to equal ${P_{\textrm{SOL}}}$. Assuming a 50 % radiation fraction, this gives the heat flux profiles shown in figure 2 with peak heat fluxes at the inner and outer divertor of 257 and 357 MW m⁻² respectively.

Figure 2. SPARC V2 divertor surface heat fluxes shown as a function of distance along the divertor target surface. The profiles assume a 50 % divertor radiation fraction that is ‘returned’ to the profile as a uniform background heat flux term across the entire target surface resulting in the small non-zero values of ${q_{\textrm{Surf}}}$ at the ends of the profiles shown. The rest of the profile follows an Eich et al. (Reference Eich, Sieglin, Scarabosio, Fundamenski, Goldston and Herrmann2011a) profile with ${\lambda _q} = 0.18\;\textrm{mm}$ and $S = {\lambda _q}/2$. Note that the total integrated power over both divertors is 31.9 MW and includes an additional 10 % power owing to the conservative power-sharing assumptions.

2.6. Divertor ELM loading

Through a study of the SPARC pedestal included in a companion paper (Hughes et al. Reference Hughes, Howard, Rodriguez-Fernandez, Creely, Kuang, Snyder, Wilks, Sweeney and Greenwald2020), it is anticipated that Type 1 ELMs size $\mathrm{(\Delta }{W_{\textrm{ped}}})$ in SPARC V2 will be greater than 1 MJ per ELM (14–22 % of the pedestal stored energy). To translate that ELM energy into divertor power loading we utilize a multi-machine database by Eich et al. (Reference Eich, Sieglin, Thornton, Faitsch, Kirk, Herrmann and Suttrop2017) which provides an approximate model for the peak parallel ELM energy fluence $({\epsilon _{{\parallel} ,\textrm{peak}}})$ on the divertor target that has a linear dependence on the pedestal pressure. In that study the surface heat flux to the divertor is integrated in time across an ELM pulse and projected parallel to the magnetic field using the steady state magnetic field line incident angle. The ${2^ \circ }$ incident field line angle assumed in § 2.5 will be used here to project ${\epsilon _{{\parallel} ,\textrm{peak}}}$ into a target surface thermal load. It has been experimentally observed that the ELM power deposition at the divertor target comes in two phases (Loarte et al. Reference Loarte, Lipschultz, Kukushkin, Matthews, Stangeby, Asakura, Counsell, Federici, Kallenbach and Krieger2007; Eich et al. Reference Eich, Thomsen, Fundamenski, Arnoux, Brezinsek, Devaux, Herrmann, Jachmich and Rapp2011b): an initial fast deposition phase where a significant fraction of the ELM energy is deposited on a short timescale $({\tau _{\textrm{ELM}}})$ leading to a rise in the divertor target surface temperatures; and a second slower phase where power continues to be deposited on the divertor targets at a lower level and the surface temperature begins to decrease. The initial fast phase is the most damaging on material surfaces and ${\tau _{\textrm{ELM}}}$ has been experimentally observed to correspond to twice the pedestal transit time for ions in the SOL (Loarte et al. Reference Loarte, Lipschultz, Kukushkin, Matthews, Stangeby, Asakura, Counsell, Federici, Kallenbach and Krieger2007). For SPARC V2, assuming a pedestal pressure of 325 kPa and pedestal density of ${n_{e,\textrm{ped}}} = 2.8 \times {10^{20}}\;{\textrm{m}^{ - 3}}$, we find that ${\tau _{\textrm{ELM}}}\sim 0.120\;\textrm{ms}$ and ${\epsilon _{{\parallel} ,\textrm{peak}}} \approx 10.7-32\;\textrm{MJ}\,{\textrm{m}^{ - 2}}$. Note the factor of three range in ${\epsilon _{{\parallel} ,\textrm{peak}}}$, which roughly corresponds to the range in ELM loading observed in experiments between small and large ELMs. This is remarkably close to the energy fluence scaling projection for ITER at ${\epsilon _{{\parallel} ,\textrm{peak}}} \approx 10-30\;\textrm{MJ}\,{\textrm{m}^{ - 2}}$ (Eich et al. Reference Eich, Sieglin, Thornton, Faitsch, Kirk, Herrmann and Suttrop2017).

A common figure of merit for transient thermal loading is the surface heat flux factor (Pintsuk et al. Reference Pintsuk, Kühnlein, Linke and Rödig2007). For a given material, the heat flux factor is a proxy for the resulting surface temperature rise based on an infinite semi-plane approximation. Approximately 15–40 % of the ELM energy fluence is deposited during the first fast phase of an ELM (Loarte et al. Reference Loarte, Lipschultz, Kukushkin, Matthews, Stangeby, Asakura, Counsell, Federici, Kallenbach and Krieger2007). Accounting for this and assuming an incident field line angle of ${2^ \circ }$, ${\epsilon _{{\parallel} ,\textrm{peak}}}$ and ${\tau _{\textrm{ELM}}}$ can be combined to calculate the surface heat flux factor for SPARC V2: $\textrm{HH}{\textrm{F}_{\textrm{ELM}}} \approx 5.1-41\;\textrm{MJ}\,{\textrm{m}^{ - 2}}\,{\textrm{s}^{ - 1/2}}$. There is significant uncertainty in this prediction captured by the wide range in the expected transient thermal loading of the divertor targets, the upper end of which is close to the cited surface melt limit of tungsten $\mathrm{\sim }50\;\textrm{MJ}\,{\textrm{m}^{ - 2}}\,{\textrm{s}^{ - 1/2}}$ (Pintsuk et al. Reference Pintsuk, Kühnlein, Linke and Rödig2007) and where cracks have been generated $\mathrm{\sim }30\;\textrm{MJ}\,{\textrm{m}^{ - 2}}\,{\textrm{s}^{ - 1/2}}$ (Hirai et al. Reference Hirai, Pintsuk, Linke and Batilliot2009). These ELM loads on a carbon divertor would lead to localized ‘blooms’ (Ulrickson, JET Team & TFTR Team Reference Ulrickson1990). Current efforts within the team are focused on reducing the uncertainty to more tightly bound predictions.

ELM mitigation techniques are being assessed for SPARC, as is the potential to access intrinsically ELM suppressed regimes. Any ELM mitigation or suppression technique is likely to result in reduced operating pedestal. Nonetheless, core transport modelling indicates that even if the predicted pedestal pressure drops by half due to ELM suppression, core plasma performance will still meet the primary mission of SPARC with Q > 2 (Hughes et al. Reference Hughes, Howard, Rodriguez-Fernandez, Creely, Kuang, Snyder, Wilks, Sweeney and Greenwald2020; Rodriguez-Fernandez et al. Reference Rodriguez-Fernandez, Howard, Greenwald, Creely, Hughes, Wright, Holland, Lin and Sciortino2020). Figure 3, estimates the ELM size and ${q_{\textrm{ELM,peak}}}$ on the divertor as a function of pedestal pressure. A scheme for ELM mitigation in SPARC has yet to be developed, but this presents a potential pathway by which divertor survivability can be ensured while still meeting the primary mission of SPARC.

Figure 3. ELM size and the divertor peak surface heat flux predictions for SPARC V2 as a function of pedestal pressure. The two lines in each subplot bracket the range in the anticipated values. The critical surface melt limit for tungsten is shown given an expected ${\tau _{\textrm{ELM}}}\sim 0.12\;\; \textrm{ms}$.

2.7. Divertor disruption loading

Thermal and structural loading during disruptions is a significant concern for SPARC and is the subject of a companion article (Sweeney et al. Reference Sweeney, Creely, Doody, Fülöp, Garnier, Granetz, Greenwald, Hesslow, Irby and Izzo2020) where the timescales and energy release are predicted. An unmitigated disruption can deposit up to 90 % (Riccardo & Loarte Reference Riccardo and Loarte2005) of the plasma stored energy (24.3 MJ) onto the divertor over the thermal quench timescale (0.1 ms). There is significant uncertainty as to the heat flux footprint during the thermal quench. Experimental measurements suggest that the footprint might grow by a factor of 3–10 (Riccardo & Loarte Reference Riccardo and Loarte2005), or even up to a factor of 20 (Hender et al. Reference Hender, Wesley, Bialek, Bondeson, Boozer, Buttery, Garofalo, Goodman, Granetz and Gribov2007). Assuming that the steady-state power sharing between the inner and outer divertor as well as the divertor target surface incident field line angle, an unmitigated disruption results in a transient thermal loading to the divertor surface with a heat flux factor of approximately $5.3-36\;\textrm{GJ}\,{\textrm{m}^{ - 2}}\,{\textrm{s}^{ - 1/2}}$. Note that this approximation only considers the stored thermal energy of the plasma and not the poloidal magnetic energy which could also contribute to surface heating of the PFCs (Lipschultz et al. Reference Lipschultz, Whyte, Granetz, Loarte, Reinke and Wolfe2011), but on a timescale that is one to two orders of magnitude longer. Even on the low end of this range, the heat flux pulse will result in flash melting for tungsten or a ‘bloom’ for carbon. Simulations are underway to determine whether such high transient thermal loads will result in bulk melting of the tungsten PFCs, which can lead to permanent deformation of the divertor target tile surfaces and negatively affect operations. Even if no bulk melting is expected, the flash melting of tungsten or the erosion of carbon PFCs would result in significant dust production, which can also negatively affect operations once a significant amount has accumulated: affecting core impurity content, as a fire hazard and for tritium retention. An emphasis is being placed on disruption mitigation in SPARC making use of the ITER ‘disruption budget’ approach to determine what would be acceptable operational protocols.

In addition to thermal loads, disruptions result in significant structural loads on PFCs. Eddy and halo currents that are driven by the disrupting plasma lead to significant mechanical stresses in the material and, more importantly, in structural mounting joints. These loads have been quantified by Sweeney et al. (Reference Sweeney, Creely, Doody, Fülöp, Garnier, Granetz, Greenwald, Hesslow, Irby and Izzo2020) and efforts are underway to design in-vessel components that will be able to withstand these forces.

Both the steady-state heat fluxes (figure 2) as well as the transient loading from ELMs and disruptions can severely stress PFCs. The design of the SPARC divertor to safely accept the steady-state heat fluxes with strike point sweeping is discussed in the next section along with the plan of incorporating transient loads into the design process.

4.1. Preliminary UEDGE simulations with 1 % carbon

In this section, we present results from UEDGE (Rognlien et al. Reference Rognlien, Milovich, Rensink and Porter1992) modelling of the SPARC V2 double-null equilibrium in an up–down symmetric simulation. UEDGE solves the Braginskii fluid equations for the plasma with specified anomalous cross-field transport coefficients. A fluid model is utilized for the neutral transport that is appropriate for a short neutral mean free path regime as is anticipated in the SPARC divertor. For impurity radiation, the fixed-fraction impurity model is used and is tied to a fraction of the ion/electron density. Impurity radiation rates are obtained from the ADPAK code (Hulse Reference Hulse1983). The equations are discretized by a finite volume method on a 2-D spatial grid, and solved by fully implicit methods, finding exact steady states to machine precision.

For setting up the magnetic geometry, UEDGE uses the equilibrium of the SPARC primary reference discharge and creates a grid conformal to the magnetic flux surfaces in the region of ${\psi _N} \approx 0.98-1.02$, where ${\psi _N}$ is poloidal magnetic flux normalized to the value at the separatrix. The simulations are performed in the lower half-domain, below the midplane, assuming a balanced double-null configuration, with corresponding upstream profile and power sharing assumptions. For the simulation results shown here, the target plate is chosen to be normal to the flux surfaces. Boundary conditions are specified to match SPARC upstream operation parameters and to determine as accurately as possible the variables of interest at the outer boundary, approaching the limiter and walls. At the core interface, the boundary conditions use fixed plasma density, fixed ion and electron power and zero radial derivative of the parallel ion velocity. In the simulations, the total power into the edge domain is generally set to 20 MW, although this will be pushed as high as 29 MW to investigate SPARC operation at full power. The common flux region (edge of grid towards PFC surfaces) boundary conditions are extrapolated ion/electron density, ion temperature and electron temperature. The private flux region has boundary conditions for density and temperature specifying a gradient scale length of 1 cm (value divided by its derivative in the radial direction). Assuming that material surfaces reach saturation, the neutral recycling coefficient is set to 1 for all material wall boundaries. This means that each ion crossing the boundary reappears locally as a neutral, and none are injected into the system or pumped. The standard sheath boundary conditions are used at the divertor targets.

The cross-field diffusive transport coefficients relate density and energy fluxes to their gradients, i.e. ${\varGamma _{n, \bot }} ={-} D{\bf \nabla }n$. The radial transport coefficients are user-specified to match predicted midplane plasma profiles, heat flux profiles on the target plates and inner/outer divertor power sharing, from empirical scalings and experimental data. The simulation domain was split into three regions: from the midplane to the X-point of the high field side (imp); from the midplane to the X-point on the low field side (omp); and the two divertor leg regions. The transport profiles shown in figure 9 were constant along flux surfaces in their respective domain. Across the entire simulation domain, the radial ion momentum diffusion coefficient is set to 0.5 m² s⁻¹. The radial energy diffusion coefficient $(\chi )$ for both ions and electrons is set to the values shown in figure 9, with low transport on the inboard side and enhanced transport with a barrier to simulation the pedestal on the outboard side. A flat $\chi $ of 0.1 m² s⁻¹ was used across the divertor legs consistent with outboard side value, but without the transport barrier. The depth of the energy transport barrier is used to control the exponential decay length of the parallel heat flux profile at the entrance to the outer divertor. Decreasing $\chi $ on the inboard side results in decreased power to the inner divertor target, and this was set such that the divertor power sharing was 1 : 4 near the X-point at full power with no impurities consistent with experimental observations of double-null power sharing. The radial density diffusion coefficient, D, is set to the values shown in figure 9. D, along with the core density, is set to obtain the desired upstream density profile. The inboard and outboard D profiles shown in figure 9 were constant along flux surfaces all the way from the midplane to the divertor target. The D profile which rises in the radially outward direction on the outboard side is a stand-in for convective transport (Umansky et al. Reference Umansky, Krasheninnikov, LaBombard and Terry1998). UEDGE runs including the convective transport terms are being developed. Some of the presented simulation parameters are also adjusted in individual cells to ensure converging solutions; the solver sometimes has difficulty converging owing to cells with very low density, especially near the end points of the divertor targets. Experimental data informing the value of the diffusion coefficients everywhere in the plasma are scarce, and no data exist on long-legged divertor transport, so the values used here are mostly ad hoc and tuned to match experimental profile predictions where available for fully attached divertor conditions with no impurities.

Figure 9. Particle $(D)$ and energy $(\chi )$ cross-field diffusion transport coefficients profiles at the inner (imp) and outer midplanes (omp).

A case with 1 % carbon fraction, ${P_{\textrm{SOL}}} = 20\;\textrm{MW}$, and a separatrix density of $1 \times {10^{20}}\;{\textrm{m}^{ - 3}}$ is shown in figures 10–12. In figure 10, the density and temperature at the outer divertor target are mapped to the outer midplane. Target plate plasma temperatures are low while densities are high, indicating high recycling conditions. The inner target profiles are not shown, but and the target plasma temperature $(\mathrm{\sim }3.5\;\textrm{eV)}$ is reduced significantly from midplane values and the target surface heat flux has also dropped to manageable levels of <1 MW m⁻². Figure 11 shows the convected and conducted power from ions, electrons and neutrals entering the outer divertor, in the direction parallel to the magnetic field near the X-point. A single exponential fit to the data indicates a heat flux width of 0.215 mm, close to the empirical prediction of 0.18 mm by Eich et al. (Reference Eich, Leonard, Pitts, Fundamenski, Goldston, Gray, Herrmann, Kirk, Kallenbach and Kardaun2013). Finally, a breakdown of the power to the outer divertor target is shown in figure 12. Convection, conduction and surface recombination are the dominant contributors; radiation has relatively little effect. This picture is different for the inner divertor target, where heat flux to the surface is dominated by radiation. The broadening of the heat flux profile relative to the X-point is being investigated. There are likely some effects owing to neutrals and side-wall interactions in the long-leg divertor geometry (Umansky et al. Reference Umansky, LaBombard, Brunner, Rensink, Rognlien, Terry and Whyte2019). These power loss mechanisms might explain the low target temperatures despite the relatively low impurity fraction.

Figure 10. Density and temperature profiles at the outer divertor target plate mapped along flux surfaces to the outer midplane.

Figure 11. Convected and conducted power including electron, ion and neutral energy flux parallel to the magnetic field at the outboard side X-point, mapped along flux surfaces to the outer midplane. The total power crossing into the outer divertor is shown in parentheses in the legend. The dashed line shows a single exponential fit to the data from which the heat flux width is obtained.

Figure 12. Total power flux to outer divertor target and its components mapped along flux surfaces to the outer midplane. The total power of each component is shown in parentheses in the legend.

These results suggest that a combination of the long tightly baffled divertor leg geometry used in the simulations and a low level of impurities may be sufficient to significantly reduce the peak heat fluxes to the divertor target as compared with the profiles shown in figure 2. However, care should be taken in the interpretation of quantitative results from a single UEDGE simulation owing to the significant uncertainty in the assumed cross-field transport coefficients and other inputs. Sensitivity scans are planned to increase the overall confidence. Furthermore, UEDGE simulations are being developed to provide a wide 2-D scan in both power and impurity fraction with carbon and neon. This will help provide a map of the parameter space at which detachment is possible and the overall qualitative trends that can be used to inform divertor design decisions. Additional simulations are also planned for lower single-null discharges. These full domain simulations will allow for drift terms to be included and will provide high-fidelity predictions of SOL and divertor behaviour in SPARC.

4.2. Preliminary SOLPS simulation results

The SOLPS-ITER code (Bonnin et al. Reference Bonnin, Dekeyser, Pitts, Coster, Voskoboynikov and Wiesen2016) is applied to SPARC to study particle balance and impurity seeding properties of SPARC. Specifically, the simulations will be used to inform requirements on the fuel ion puffing location and flow rate, estimate the neutral pressure in the sub-divertor as needed to design pumping systems and estimate impurity flow rate requirements and optimal puffing location to reduce the divertor heat flux via dissipation. Simulations are performed for SPARC V2, but in an unbalanced double null topology biased towards the lower divertor. The distance between the two X-points when mapped along flux surfaces to the outer midplane is 2 mm, which is large compared with the baseline design SOL heat flux width discussed in § 2.2. Figure 13 shows the SOLPS-ITER grid, with the coloured regions used for plasma and neutral transport, and the black triangulated region treated as vacuum for neutral transport only. The initial simulations shown here are unseeded. The code inputs are core boundary conditions of 29 MW of power into the SOL, equally split between electrons and ions, and a density of $1.5 \times {10^{20}}\;{\textrm{m}^{ - 3}}$, which corresponds to a separatrix density at the outboard midplane of $1.0 \times {10^{20}}\;{\textrm{m}^{ - 3}}$. The indicated surface is used to pump neutral particles, with a recycling coefficient of 0.9. Cross-field transport coefficients of ${\chi _ \bot } = 0.01\;{\textrm{m}^2}\,{\textrm{s}^{ - 1}}$ and ${D_ \bot } = 0.1\;{\textrm{m}^2}\,{\textrm{s}^{ - 1}}$ are chosen to reproduce the extrapolated heat flux width (figure 14), an exponential fit near the separatrix gives a decay length of 0.14 mm.

Figure 13. SOLPS-ITER grid used for SPARC simulations. Coloured regions indicate mesh for plasma transport, whereas the coloured mesh and black triangles are available for kinetic neutral transport.

Figure 14. Parallel heat flux density at the outboard side X-point, mapped along flux surfaces to the outer midplane. Note that the parallel heat flux shown is higher than in figure 11 of the previous UEDGE simulations that used a lower ${P_{\textrm{SOL}}}$ and assumed perfectly balanced double-null power sharing.

Figure 15 shows profiles of the electron density and temperature, as well as the particle and heat fluxes carried by the plasma at the lower outer divertor. Without seeding the divertor is strongly attached, with high electron temperature $(T_e^{\textrm{peak}} \approx 300\;\textrm{eV})$ and modest density $(n_e^{\textrm{peak}} \approx 1.7 \times {10^{21}}\;{\textrm{m}^{ - 3}})$. The peak heat flux density $q_{\textrm{surf}}^{\textrm{peak}}$ is ${\approx} \textrm{180}\;\textrm{MW}\,{\textrm{m}^{ - 2}}$, with ~22 MW of power deposited at the outer target. Compared with figure 2, the difference in peak surface heat flux is largely due to the lower incident angle of the magnetic field at the target used in the SOLPS simulation (~0.8° at the OSP, 2° in figure 2). Accounting for this difference, there is reasonably good agreement between the SOLPS modelling and simple estimates with the Eich model, which increases confidence in the simulation output. The peak particle flux density $\varGamma _ \bot ^{\textrm{peak}}$ is $\mathrm{\sim }{10^{24}}\;{\textrm{m}^{ - 2}}\,{\textrm{s}^{ - 1}}$, occurs further into the SOL as compared with $q_{\textrm{surf}}^{\textrm{peak}}$, and is similar in magnitude to typical values for partially detached conditions in ITER (Pitts et al. Reference Pitts, Bonnin, Escourbiac, Frerichs, Gunn, Hirai, Kukushkin, Kaveeva, Miller and Moulton2019). The values are similar despite the different transport regimes, because of the much higher divertor T_e in SPARC.

Figure 15. Radial profiles as a function of distance along the outer divertor target of (a) electron density, (b) electron temperature, (c) deposited heat flux carried by the plasma and (d) deposited ion particle flux.

4.3. Lengyel model estimates of impurity fraction

As a parallel scoping of the operating space of the divertor versus impurity fraction we have utilized the simple Lengyel model applied by Reinke (Reference Reinke2017). The model derives the required impurity fraction that is consistent with a target temperature that both satisfies the desired reduction of q _|| due to radiation as well as the sheath heat flux boundary condition, assuming a sheath heat flux coefficient of $\gamma = 7$. This is shown in figure 16 for connection length, ${L_\parallel } = 24\;\textrm{m}$, upstream density, ${n_u} = 1.0 \times {10^{20}}\;{\textrm{m}^{ - 3}}$, and using a non-coronal radiation model for neon and argon assuming a finite impurity residence time, ${n_e}\tau = 0.5 \times {10^{20}}\;{\textrm{m}^{ - 3}}\,\textrm{ms}$.

Figure 16. The radiation fraction $(\,{f_{\textrm{rad}}})$ as a function of the impurity fraction $(\,{f_Z})$ for (a) neon and (b) argon, calculated using the Lengyel model.

SPARC highlights an interesting behaviour found in its parameter space that is a result of its access to high parallel heat fluxes and low ${f_{\textrm{GW}}}$ operational point. At low upstream ${q_\parallel }\sim 0.5\;\textrm{GW}\,{\textrm{m}^{ - 2}}$ there is the expected behaviour that as the impurity fraction is increased, the SOL radiation fraction increases monotonically. An arbitrary SOL radiation fraction is possible, although the non-linearity suggests that control may be a challenge. At higher ${q_\parallel }$, the behaviour fundamentally shifts, and unless the impurity fraction reaches a higher level there is no solution, i.e. there is no target temperature where the radiation fraction reaches tens of percent and the sheath heat flux boundary condition is satisfied. The lack of a solution may be due in part to the Lengyel model analysis assuming a conduction-limited SOL which is not realized at high ${q_\parallel }$ and low ${n_u}$ where a sheath-limited SOL is expected. This is interpreted as due to the high attached target temperature, the SOL can progressively fill with impurities, in this case neon or argon, without causing any substantive radiation until a tipping point is reached, the target temperature collapses and the radiation fraction jumps to a high level. This ‘minimum’ radiation fraction increases progressively as ${q_\parallel }$ is increased as shown in figure 16. Furthermore, there exists a hot and cold branch where the sheath heat flux boundary condition can be satisfied, owing to the non-linear nature of the impurity cooling curves. Increasing the upstream density moves the transition to this bifurcated behaviour to higher ${q_\parallel }$, and it is also sensitive to the selection of impurity and assumption of its ${n_e}\tau $. The Lengyel model suggest that SPARC may not have arbitrary control over its divertor radiated power. When target plate temperatures start to decreases from the $\mathrm{\sim }300\;\textrm{eV}$ predictions of the SOLPS simulations (figure 15), divertor radiation fractions may already be significantly higher than the 50 % assumed in § 2. This is in contrast to the results from UEDGE and efforts are underway to understand the discrepancies. Further analysis is required to understand the behaviour of the model and comparisons made to the other simulations to increase the confidence in this result.