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Nanotheranostics 2024; 8(3): 380-400. [Abstract] [Full text] [PDF]
Nanotheranostics 2024; 8(3): 344-379. [Abstract] [Full text] [PDF] [PubMed] [PMC]
International Journal of Biological Sciences
International Journal of Medical Sciences
Global reach, higher impact
Theranostics 2019; 9(21):6143-6156. doi:10.7150/thno.37284 This issue Cite
Research Paper
Automatic Respiratory Gating Hepatic DCEUS-based Dual-phase Multi-parametric Functional Perfusion Imaging using a Derivative Principal Component Analysis
Diya Wang1,2, 
, Guy Cloutier2,3, Yan Fan4, Yanli Hou5, Zhe Su1, Qiang Su5, , Mingxi Wan1,
1. Department of Biomedical Engineering, School of Life Science and Technology, Xi' an Jiaotong University, Xi' an, P. R. China.
2. University of Montreal Hospital Research Center, Montreal, QC, Canada.
3. Department of Radiology, Radio-Oncology and Nuclear Medicine, and Institute of Biomedical Engineering, University of Montreal, Montreal, QC, Canada.
4. Alliance Franco-Chinoise, Montreal, QC, Canada.
5. Department of Oncology, Beijing Friendship Hospital, Capital Medical University, Beijing, 1000050, P. R. China.
Abstract
Purpose: Angiogenesis in liver cancers can be characterized by hepatic functional perfusion imaging (FPI) on the basis of dynamic contrast-enhanced ultrasound (DCEUS). However, accuracy is limited by breathing motion which results in out-of-plane image artifacts. Current hepatic FPI studies do not correct for these artifacts and lack the evaluation of correction accuracy. Thus, a hepatic DCEUS-based dual-phase multi-parametric FPI (DM-FPI) scheme using a derivative principal component analysis (PCA) respiratory gating is proposed to overcome these limitations.
Materials and Methods: By considering severe 3D out-of-plane respiratory motions, the proposed scheme's accuracy was verified with in vitro DCEUS experiments in a flow model mimicking a hepatic vein. The feasibility was further demonstrated by considering in vivo DCEUS measurements in normal rabbit livers, and hepatic cavernous hemangioma and hepatocellular carcinoma in patients. After respiratory kinetics was extracted through PCA of DCEUS sequences under free-breathing condition, dual-phase respiratory gating microbubble kinetics was identified by using a derivative PCA zero-crossing dual-phase detection, respectively. Six dual-phase hemodynamic parameters were estimated from the dual-phase microbubble kinetics and DM-FPI was then reconstructed via color-coding to quantify 2.5D angiogenic hemodynamic distribution for live tumors.
Results: Compared with no respiratory gating, the mean square error of respiratory gating DM-FPI decreased by 1893.9 ± 965.4 (p < 0.05), and mean noise coefficients decreased by 17.5 ± 7.1 (p < 0.05), whereas correlation coefficients improved by 0.4 ± 0.2 (p < 0.01). DM-FPI observably removed severe respiratory motion artifacts on PFI and markedly enhanced the accuracy and robustness both in vitro and in vivo.
Conclusions: DM-FPI precisely characterized and distinguished the heterogeneous angiogenic hemodynamics about perfusion volume, blood flow and flow rate within two anatomical sections in the normal liver, and in benign and malignant hepatic tumors. DCEUS-based DM-FPI scheme might be a useful tool to help clinicians diagnose and provide suitable therapies for liver tumors.
Keywords: contrast-enhanced ultrasound, functional perfusion imaging, respiratory motion, machine learning, principal component analysis
Introduction
Liver cancer is respectively the second and sixth major causes of death in developing and developed countries [1]. Angiogenesis from the existing hepatic branch arterioles and veins holds a key role in the fast expansion of hepatocarcinoma cells, through nutrient feeding from normal tissues [2-5]. Angiogenic perfusion is thus of importance to identify tumors and grade their stages [4, 5]. For this purpose, dynamic contrast-enhanced ultrasound (DCEUS) using microbubble contrast agents have been proven of interest in angiogenic perfusion monitoring for liver tumors [5-9].
In comparison with several perfusion imaging techniques based on computerized tomography and nuclear magnetic spin imaging, DCEUS is a more low-cost, real-time, and non-irradiating technique for the easy bedside use [10-12]. Backscattered echoes in blood are initially heightened through microbubble injection in DCEUS [13]. With similar sizes with red blood cells, these microbubbles show up strong nonlinear scattering under insonation [13]. These microbubbles' transient, linear, and nonlinear backscattered echoes are then developed by using DCEUS technologies [14, 15]. These specific techniques aim to control backscattered echoes of tissue, motivate microbubble signals, and enhance discrimination of microvessels [14, 15]. DCEUS has thus been widely utilized to monitor microvascular spreading and their microcirculation during tumor growth, especially in hepatic tumors [12, 16, 17].
Among quantitative DCEUS techniques, functional perfusion imaging (FPI) based on bolus detected kinetics was proposed to quantify detailed hemodynamics in angiogenesis [8, 9, 18]. The homodynamic parameters related with time, intensity, and ratio were calculated from microbubble-enhanced time-intensity curve (TIC) to develop multi-parametric FPI technique [19-21]. These parameters are in direct proportion to the blood flow, perfusion volume, and flow rate, respectively [8, 12, 21]. Angiogenic perfusion using DCEUS-based FPI could characterize hepatic cirrhosis [22, 23], nodular hyperplasia [7, 17], hemangioma [7, 17], hepatocellular carcinoma [22, 24], and other metastatic cancers [8, 16].
Conventional FPI depicts and quantifies the 2D hemodynamics in angiogenesis at only one anatomical section without 3D perfusion information [8, 18]. Moreover, the accuracy and robustness of conventional FPI are seriously limited by tissue deformation and respiratory motion artifacts [19, 25]. The respiration causes out-of-plane motion affecting the characterization of angiogenesis and may contort the shape, dimension, and position of tumors identified by FPI [17]. These disturbances not only decrease the TICs' signal-to-clutter ratio (SCR) [26] but also severely distort hepatic DCEUS-based FPI due to regions-of-interest (ROIs) misalignment and TIC kinetics misregistration [19, 27].
To weaken the influence of respiration on abdominal DCEUS, breath-holding is still used for short examinations. However, it is infeasible for long perfusion imaging (up to several minutes), especially for patients with cardiopulmonary diseases [19, 28]. Thus, various respiratory motion compensation strategies have been investigated for abdominal DCEUS studies with free-breathing [16, 17, 19, 27]. External sensor and tracking systems were used to capture DCEUS images in the same breathing phase [29]. However, these systems enhance the duration of examinations, which is often impracticable clinically [28]. As an alternative, semi-automatic 2D and 3D registration methods were developed based on images [7, 16, 17]. However, these registration strategies were always initialized by a manual drawing of ROI, of which motion tracking is controversial in handling out-of-plane frames and unavailable anatomical landmarks [7, 17].
To overcome limitations of abovementioned compensation strategies, semiautomatic and fully automatic respiratory gating methods employing machine learning algorithms have been developed in recent years. Using independent component analysis, a posteriori respiratory gating DCEUS approach was proposed based on an assumption of independence between microbubble kinetics and breathing motion [28]. Whereas, the assumption could not be confirmed [7, 17], and the reliability of the respiratory gating strategy for DCEUS-based FPI could not be guaranteed [19]. A principal component analysis (PCA) was implemented on respiratory kinetics in the framework of DCEUS for focal liver lesion assessment [7, 30]. Although orthonormal components in PCA of respiratory kinetics [27] overcome the dubious independence assumption in the independent component analysis [19], the use of PCA is still limited by the lack of validation of FPI and a breathing rate foreknowledge [27] and tumor location [7]. In some cases, some orthonormal components in PCA are negative. Hemodynamics and breathing curves can thus be taken as a problem of non-negative matrix factorization to ensure valid respiratory motion compensation in abdominal DCEUS studies [19, 31]. But the non-negative assumption may be unnecessary for a correct respiratory gating.
In vitro and in vivo abdominal DCEUS-based FPI of a single respiratory phase was reconstructed by considering slight out-of-plane motion [19, 32]. 1D perfusion quantification was also corrected under an extreme condition of out-of-plane motion in our previous study [33]. However, to our knowledge, no study has been conducted on 2D DCEUS-based FPI with serious distortion of angiogenesis under a condition of extreme out-of-plane breathing motion. Out-of-plane motion results in severe image artifacts which inevitably exist in free-breathing hepatic DCEUS studies [19, 32]. Under this condition, abovementioned compensation strategies are meaningless and the gating strategies have not been proven to be reliable in the context of DCEUS-based FPI. Moreover, the accuracy of in vivo respiratory gating FPI is unknown because of the uncontrolled DCEUS without respiratory motion and the unknown ground truth of in vivo respiratory curves [7, 27, 28]. Therefore, a hepatic DCEUS-based dual-phase multi-parametric FPI (DM-FPI) scheme using derivative PCA respiratory gating is proposed in this study to characterize and quantify angiogenic hemodynamics in hepatic tumors. The accuracy and feasibility of the proposed scheme were respectively illustrated through in vitro and in vivo hepatic perfusion examinations under the condition of extreme out-of-plane respiratory motion. A list of abbreviations used in this study is given in Table 1.
List of abbreviations
| DCEUS | dynamic contrast-enhanced ultrasound | HCH | hepatic cavernous hemangioma |
|---|---|---|---|
| PCA | principal component analysis | HCC | hepatocellular carcinoma |
| TIC | time-intensity curve | WIT | wash-in time |
| TICRG | TIC with respiratory gating | WOT | wash-out time |
| TICnoRG | TIC without respiratory gating | PV | peak value |
| TICstatic | static TIC without respiratory motion artifacts | AUC | area under curve |
| FPI | functional perfusion imaging | WIR | wash-in rate |
| FPIRG | FPI with respiratory gating | WOR | wash-out rate |
| FPInoRG | FPI without respiratory gating | SCR | signal-to-clutter ratio |
| FPIstatic | static FPI without respiratory motion artifacts | MSE | mean square error |
| DM-FPI | dual-phase multi-parametric FPI | R | correlation coefficient |
| EOI | end-of-inspiration | MNC | mean noise coefficient |
| EOE | end-of-expiration |
Materials and Methods
In vitro Experiments
An ultrasound scanner (#G50, Vinno Inc., Suzhou, China) utilizing a linear transducer was applied for in vitro perfusion experiments (n = 20) to validate the accuracy of the proposed respiratory gating DM-FPI scheme. Table 2 displays the experimental parameter settings. A wide dynamic range was used to avoid saturation of DCEUS sequences which enabled the valid reconstruction of DM-FPI [34]. The transducer was attached onto a controllable 3D rotary motion system to produce out-of-plane motion and to record backscatter echoes from a mimicked hepatic vein (diameter and wall thickness: 5 and 1.5 mm; Shuguang, Xi'an, China). A 0.9% normal saline solution was circulated in the flow phantom with a mean flow of 10 ml/s controlled by a flexible tubepump (#BT300-1F, Longer, Baoding, China). A bolus of 0.2 mL diluent of microbubbles (2×105 bubbles/mL; SonoVue, Bracco, Milan, Italy), which were made of phospholipid encapsulated sulfur hexafluoride, was injected via an infusion outfit into the flow phantom. The transducer's 3D rotary motion was regulated by an electronic control system (#MC600, PSA-11AS, Zolix, Beijing, China) to simulate out-of-plane breathing motion and to result in an extreme 3D periodic rotational motion in DCEUS loops. Thus, DCEUS loops exhibited an serious deformation of the mimicked hepatic vein with a simulated respiratory frequency of 0.27 Hz [35]. Pulse-inversion contrast harmonic imaging technique [14, 15] was used to record all in vitro DCEUS loops with respiratory motion artifacts. Moreover, in vitro static DCEUS loops without breathing motion artifacts at fixed end-of-expiration (EOE) and end-of-inspiration (EOI) phases were respectively recorded as ground truths to assess the respiratory gating accuracy in the proposed DM-FPI scheme.
In vitro and in vivo experimental parameter settings
| In vitro model | In vivo liver | |||
|---|---|---|---|---|
| Normal† | HCH | HCC | ||
| Respiratory number | 889 | 216 | 51 | 60 |
| Mechanical index | 0.05 | 0.05 | 0.07 | 0.10 |
| Work frequency (MHz) | 4 | 4.4 | 4.4 | 4.4 |
| Frame rate (Hz) | 21.3 | 15 | 10 | 30 |
| Dynamic range (dB) | 154 | 120 | 135 | 135 |
| Valid perfusion time (s) | 120-160 | 90-135 | 60-90 | 60-90 |
† normal hepatic perfusion experiments of healthy rabbits.
In vivo Experiments
An ultrasound platform (#DC-8, Mindray Inc., Shenzhen, China) using a convex array was utilized for in vivo hepatic (n = 14) perfusion experiments to validate the feasibility of the proposed respiratory gating DM-FPI scheme. Experimental acquisitions included 8 healthy rabbits, 6 patients with diagnosed symptoms of hepatic cavernous hemangioma (HCH, n = 3) and hepatocellular carcinoma (HCC, n = 3, one with a leak). Patients (2 females and 4 males) were 45 to 69 years old. As performed in the previous studies [19, 20], the normal hepatic perfusion experiments were conducted in healthy rabbits instead of humans because of ethical restrictions.
After the rabbits were anesthetized with a 3% concentration of mebumalnatrium, a bolus of SonoVue diluent (0.2 ‒ 0.5 mL, 2 × 108 bubbles/mL) was intravenously injected [19, 20]. The patients were asked to breathe freely and a bolus of SonoVue diluent (2.5 mL, 2 × 108 bubbles/mL) was also intravenously injected and then immediately washed with 0.9% normal saline [8, 19]. DCEUS sequences of patients were recorded in local hospitals. The Local Research Ethics Committee approved this study. The consent forms of patients were obtained before the examination. All in vivo DCEUS loops with respiratory motion artifacts were also recorded using the same pulse-inversion contrast harmonic imaging mode. All in vitro and in vivo DCEUS sequences covered the major perfusion phases including pre-contrast, arriving, rising, filling, and complete or part falling phases of microbubbles.
Respiratory Gating DCEUS-based Dual-phase Multi-parametric FPI
Figure 1 shows the schematic diagram of the proposed automatic respiratory gating hepatic DM-FPI based on DCEUS scheme under out-of-plane artifacts induced by free-breathing. Respiratory kinetics induced by free-breathing was first extracted using the second component of PCA from DCEUS sequences. Using derivative PCA zero-crossing dual-phase detection of the respiratory kinetics, Dual-phase TICs at EOI and EOE phases were then acquired from the corresponding dual-phase respiratory gating DCEUS subsequences, respectively. The respiratory gating hepatic DCEUS-based DM-FPI was finally reconstructed after color-coding of dual-phase three styles of six hemodynamic parameters estimated from the corresponding dual-phase TICs.
Hepatic DCEUS sequences can be orthogonally linearly transformed to a new coordinate system via PCA. With this method, the greatest and the second variances of its projection respectively correspond on the first coordinate and the second orthogonal coordinate [36]. As well, PCA decomposition is used for dimensionality reduction in machine learning [36]. Thus, the 3D DCEUS sequence 
was first orthogonally linearly transformed as a 2D matrix 
at each pixel
.
(1)
(2)
where each column vector in 
is 
. T, M, and N are the numbers of frame, column, and row in I, respectively. Each 
in 
is a dynamic intensity change of all pixels in one frame at each time point t. Each 
in 
is a dynamic fluctuations of each point in 
during the whole perfusion cycle T, which can be taken as TIC of each pixel.
(3)
The alteration in 
could be taken as a linear combination of spatial weighting matrix 
and principal component vectors 
in Eq. (3) [33].
(Color online) Schematic diagram of automatic respiratory gating hepatic DCEUS-based DM-FPI. (a) Schematic of 3D deformation of hepatic angiogenesis caused by out-of-plane breathing motion in DCEUS loops, (b) respiratory kinetics estimated by using PCA, (c) respiratory gating DCEUS-based DM-FPI by using derivative PCA. DCEUS = dynamic contrast-enhanced ultrasound, DM-FPI = dual-phase multi-parametric functional perfusion imaging, PCA = principal component analysis.
(4)
where p is the component order,
represents the i-th vector of principal component in 
[33]. 
is the spatial weighting vector of 
and is quantified by using the maximal eigenvectors from the covariance 
[33]. While p is larger than 4, the remanent component
in the variance is smaller than 1.7% in [37]. So p is 4 in this study [33]. In terms of a foreknowledge of the previous validations [8, 27, 37], the second principal component 
corresponds to the respiratory kinetic curve 
, which can be estimated as:
(5)
Abnormal fluctuations and noise on raw respiratory kinetic curve 
were first removed by smoothing to obtain 
. Zero-crossing dual-phase detection was applied on the first-order derivative curve of 
to alternately identify the two extreme phases of EOI (
and EOE 
in the ascending and descending slopes in each respiratory cycle, as defined by the following equation:
(6)
As shown in Fig. 1c, the corresponding dual-phase DCEUS subsequences then formed at the same phases of 
and 
, respectively. Imaging region of two DCEUS subsequences at 
and 
was respectively divided into small equal-sized ROIs of 3×3 pixels. TICs with respiratory gating (TICRG) were then extracted pixel-by-pixel [12] by averaging the intensities of dual-phase DCEUS echoes within those ROIs at each time point. A dual-weighted moving average filter [14] was then applied in TICRG denoising to remove the clutter originated from the thermal noise and speckle effect [8] and to partly suppress recirculation noise and recover later phase [38]. Thus, the dual-phase perfusion parameter estimation from TICRG was guaranteed.
As depicted in Fig. 1c, six hepatic hemodynamic-related perfusion parameters were calculated from the dual-phase TICRG for each group data. Two time parameters are wash-in time (WIT) and wash-out time (WOT), which are proportional to the blood flow; two intensity parameters are peak value (PV) and area under curve (AUC), which are related to the local perfusion volume; and two ratio parameters are wash-in rate (WIR) and wash-out-rate (WOR), which are in direct proportion to flow rate [8, 12, 21]. More details and calculations of these perfusion parameters were introduced in [8, 32]. Each perfusion parameter was normalized and then encoded in 256 levels as a standard RGB coding rule [8, 32] to reconstruct the corresponding perfusion map. Thus, respiratory gating hepatic DCEUS-based DM-FPI was described by using the color quantification map of above parameters.
Data Processing
In vitro and in vivo FPIs without respiratory gating (FPInoRG) were reconstructed from TICs without respiratory gating (TICnoRG) to compare with respiratory gating FPI (FPIRG) of the same perfusion parameter. TICnoRG was acquired from the same DCEUS loops used for TICRG and FPIRG but without respiratory gating. Moreover, without breathing motion disturbances, in vitro static TIC (TICstatic) and FPI (FPIstatic) were considered as the control groups to assess the accuracy of the proposed respiratory gating DM-FPI scheme. TICstatic was extracted from the ROI at the same location as the in vitro static DCEUS sequences. Additionally, FPIRG, FPInoRG, and FPIstatic of the same hemodynamic parameters were adjusted to the same dynamic ranges to demonstrate the performances of the DM-FPI scheme [8].
The respiratory gating veracity of TICRG was evaluated by utilizing the SCR [26] and the mean-square-error (MSE) between TICRG and TICstatic, as defined by the following equations [32]:
(7)
(8)
where P(f) is the TIC power spectral density. fc and fs are the cut off and sample frequencies of TIC, respectively. MSE between TICnoRG and TICstatic was also calculated to compare with the MSE between TICRG and TICstatic.
The accuracy of respiratory gating DM-FPI was quantified by utilizing the MSE between FPIRG and FPIstatic and the mean correlation coefficients (R) between FPIRG and FPIstatic in the entire perfusion region, as defined by the following equations [32]:
(9)
(10)
where PRG and Pstatic are the probability densities in FPIRG and FPIstatic of one perfusion parameter, respectively, K is the number of FPI, and N is the points of PRG and Pstatic. The MSE and correlation R between FPInoRG and FPIstatic were also computed to compare with the MSE and R between FPIRG and FPIstatic.
The respiratory gating feasibility in in vivo hepatic TICs and DM-FPI were evaluated using the SCR of TICs and mean noise coefficients (MNC) of FPI in the entire perfusion region, as defined by the following equations:
(11)
where FPIj is the red, green, and blue components (j = 1, 2, 3) in the color map of FPI. 
is the mean value of FPIj.
Statistical Analysis
Mean values of perfusion results and their standard deviations were calculated and further evaluated using a t-test. Herein, a p-value < 0.01 was taken for highly significant that was marked by two asterisks in Figures and Tables. A p-value < 0.05 was regarded as statistically significant which were marked by one asterisk in Figures and Tables. Since three types of six FPIs were reconstructed at single EOE or EOI phase for each group of data, the analysis databases of in vitro, in vivo normal, HCH, and HCC data were 40, 16, 6, and 6 for each PFI type at single phase, respectively; the corresponding databases were 240, 96, 36, and 36 for of all types of dual-phase FPIs, respectively. All data processing was executed utilizing MATLAB (#2014a, MathWorks Inc., Natick, MA). Machine learning toolbox of MATLAB was used to extract the respiratory curves, which included the packages of non-negative matrix factorization, independent component analysis, and PCA.
Results
Respiratory Kinetics and Dual-phase Detection
Figures 2a and 2b show the in vitro and in vivo hepatic respiratory kinetic curves, which acquired from DCEUS loops in contrast mode and fundamental mode, respectively. The order of principal component vector in 
is related to reduction dimension [36], which is analogical with non-negative matrix factorization and independent component analysis [19, 31]. Previous studies have demonstrated that the 
well matched the respiratory motion frequency estimated from the manual frame selection in respiratory gating methods, which were further verified in the cross-validations using non-negative matrix factorization and independent component analysis [19, 27, 37]. The estimated frequency in 
was 0.27 Hz in keeping with the simulated ground truth and the results in [35]. Moreover, the estimated breathing phases in 
were also consistent with the simulated kinetic phases. Therefore, the respiratory kinetics was estimated by using the second principal component
in this study. The estimated respiratory kinetics accounted for 20.3% ± 2.9 % of all components when p was 4. In comparison with in vivo respiratory kinetics, in vitro kinetics contained some information on microbubble kinetics, and the envelope was equivalent to TICRG (see Fig. 3a). This finding illustrates that the component was dependent in the extracted breathing kinetics, which verified the uncertain independence assumption of the independent component analysis between microbubble-enhanced curves and breathing kinetics in DCEUS studies [7, 17].
These estimated respiratory kinetic curves were smoothed and the EOE and EOI phases of DCEUS loops were automatically identified via the derivative PCA zero-crossing dual-phase detection illustrated in Figs. 2a and 2b. According to EOE and EOI phases, the corresponding dual-phase hepatic DCEUS subsequences were automatically selected from raw DCEUS loops, respectively. The mimicked and in vivo hepatic veins displayed complex 3D deformation due to the serious out-of-plane artifacts caused by breathing motion. The vertical and horizontal positions and axial and lateral dimensions of the mimicked hepatic vein were altered periodically at the EOE and EOI phases in the flow model. The gallbladder without perfusion and the right and left hepatic veins with a bolus injection of microbubbles appeared alternately at the EOE and EOI phases.
Contrast-enhanced Dual-phase TICs with Respiratory Gating
Figure 3 shows in vitro and in vivo hepatic dual-phase TICRG and TICnoRG that were obtained from the dual-phase DCEUS subsequences. In vitro dual-phase TICstatic was also acquired from two static DCEUS loops without respiratory motion artifacts at two same EOE and EOI phases. ROIs for TIC computations are indicated by red rectangles with a size of 20 × 40 pixels in the partial DCEUS images of Fig. 3. Figure 3b illustrates the in vitro filtered TICs. The hemodynamic characterizations of TICRG were consistent with the ground truth TICstatic results, and completely different from those of TICnoRG. In comparison with TICRG, TICnoRG was disturbed by obvious aperiodic and periodic fluctuations caused by the out-of-plane breathing motion. These oscillations produced misregistration of TIC kinetics, wrong estimation of hemodynamic parameters describing the hepatic angiogenesis, and distortion of hepatic DCEUS-based FPI [19, 27]. Figure 4 illustrates the SCR of in vitro and in vivo hepatic TICRG and TICnoRG. In comparison with in vitro TICnoRG, the average MSE of in vitro TICRG reduced by 300.5 ± 19.8 (p < 0.01) [33]. But the average SCR of in vitro and in vivo TICRG enhanced by 3.3 ± 1.7 (p < 0.05) [33] and 2.6 ± 0.7 dB (p < 0.05), respectively, when compared with the corresponding TICnoRG.
(Color online) Comparisons of (a) in vitro and (b) in vivo hepatic respiratory kinetics estimated by using PCA (blue lines) and derivative PCA (red lines), which automatically identified dual-phase DCEUS subsequences at EOE and EOI phases via zero-crossing dual-phase detection. EOE = end-of-expiration and EOI = end-of-inspiration.
(Color online) Comparison of hepatic microbubble-enhanced TICs without breathing motion artifacts, and TICs without and with respiratory gating using derivative PCA zero-crossing dual-phase detection shown in Fig. 2. In vitro TICs (a) before and (b) after fitting, in vivo TICs at EOE and EOI phases extracted from (c) a normal hepatic vein and (d) a hepatic cavernous hemangioma. TICs = time-intensity curves.
In vitro DCEUS-based Dual-phase Multi-parametric FPI with Respiratory Gating
Three in vitro groups of dual-phase FPIstatic, FPIRG, and FPInoRG of the mimicked hepatic vein were shown in Fig. 5. Each group included two time-related DM-FPIs of WIT and WOT, two intensity-related DM-FPIs of PV and AUC, and two ratio-related DM-FPIs of WIR and WOR. In comparison with changes in FPInoRG, inhomogeneous transient variations in blood velocity, perfusion charge, and rate of flow of the mimicked hepatic vein hemodynamics were clearly presented on the time-, intensity-, and ratio-related dual-phase FPIRG, respectively. Differences in the corresponding hemodynamic distributions depicted by dual-phase FPIRG were also clearly observed at the EOI and EOE phases. Dual-phase FPIRG in Figs. 5c and 5e was identified with the corresponding ground truths in FPIstatic in Figs. 5b and 5d. In vitro FPIRG was nearly similar to the ground truth. The inhomogeneous hemodynamic mappings at various respiratory phases were overlapped and distorted in FPInoRG because of the absence of respiratory gating. As shown in Fig. 6, the accuracy in respiratory gating DM-FPI was directly quantified by utilizing the MSE and R of FPIRG and FPInoRG at EOE and EOI phases, respectively. Table 3 displays the decrease in MNC and the increase in correlation R of time-, intensity-, and ratio-related FPIRG when compared with FPInoRG in Fig. 6. In comparison with FPInoRG, the MSE of FPIRG decreased significantly by 1893.9 ± 965.4 (p < 0.05) whereas the correlation R improved significantly by 0.4 ± 0.2 (p < 0.01).
(Color online) Signal-to-clutter ratio of in vitro and in vivo hepatic TICs with and without respiratory gating using derivative PCA zero-crossing dual-phase detection.
Decrease in MSE and increase in correlation R of in vitro FPIRG compared with FPInoRG
| FPI | Decrease in MSE | Increase in R | |
|---|---|---|---|
| EOI phase | Time-related | 2418.6 ± 257.4** | 0.4 ± 0.1** |
| Intensity-related | 2653.4 ± 49.9** | 0.6 ± 0.2** | |
| Ratio-related | 2063.5 ± 736.6** | 0.6 ± 0.1** | |
| EOE phase | Time-related | 417.2 ± 717.5 | 0.3 ± 0.1** |
| Intensity-related | 1011.3 ± 578.4* | 0.4 ± 0.2* | |
| Ratio-related | 2799.6 ± 1116.7** | 0.2 ± 0.1 |
* p< 0.05, and ** p < 0.01.
In vivo DCEUS-based Dual-phase Multi-parametric FPI with Respiratory Gating
Figures 7-9 display three groups of in vivo DCEUS-based dual-phase FPInoRG and FPIRG in the normal liver of a healthy rabbit, and the HCH and HCC of two patients, respectively. Each group of DM-FPIs included one time-related FPI of WIT or WOT, one intensity-related FPI of PV or AUC, and one ratio-related FPI of WIR. Compared with aliasing in FPInoRG caused by severe out-of-plane breathing motion, in vivo hepatic blood velocity, perfusion charge, and rate of flow were clearly depicted by the time-, intensity-, and ratio-related FPIRG, respectively. Anatomical structures of the right and left hepatic veins in the normal liver were distorted in FPInoRG, which were recovered effectively by the dual-phase FPIRG of WOT. The irregular border of the HCH was accurately identified by the dual-phase FPIRG of WIT and WIR, respectively. The heterogeneous HCC angiogenesis was well quantified in the dual-phase FPIRG of AUC and WIR, respectively.
(Color online) Comparisons of in vitro DCEUS-based DM-FPI of the mimicked hepatic vein. (a) time-, intensity-, and ratio-related FPIs without respiratory gating, the corresponding static FPIs without respiratory motion artifacts at (b) the EOI and (d) EOE phases, and the corresponding respiratory gating FPIs at (c) the EOI and (e) EOE phases. WIT = wash-in time, WOT = wash-out time, PV = peak value, AUC = area under curve, WIR = wash-in rate, and WOR = wash-out rate.
(Color online) Mean square errors and correlation coefficients of in vitro hepatic DCEUS-based DM-FPI without and with respiratory gating using derivative PCA zero-crossing dual-phase detection.
(Color online) Comparisons of in vivo normal hepatic DCEUS-based DM-FPI of a healthy rabbit. (a) A time-related FPI of WOT without and with respiratory gating at the EOI and EOE phases, the corresponding (b) intensity-related FPI of PV and (c) ratio-related FPI of WIR.
(Color online) Comparisons of in vivo hepatic DCEUS-based DM-FPI of a hepatic cavernous hemangioma. (a) A time-related FPI of WIT without and with respiratory gating at the EOI and EOE phases, the corresponding (b) intensity-related FPI of AUC and (c) ratio-related FPI of WIR.
(Color online) Comparisons of in vivo hepatic DCEUS-based DM-FPI of a hepatocellular carcinoma. (a) A time-related FPI of WIT without and with respiratory gating at the EOI and EOE phases, the corresponding (b) intensity-related FPI of AUC and (c) ratio-related FPI of WIR.
(Color online) Mean noise coefficients of in vivo hepatic DCEUS-based DM-FPI without and with respiratory gating using derivative PCA zero-crossing dual-phase detection.
Figure 10 quantifies the respiratory gating performance in DCEUS-based DM-FPI using MNC of in vivo dual-phase FPIRG and FPInoRG. In comparison with FPInoRG, the decrease in MNC of time-, intensity-, and ratio-related dual-phase FPIRG within the normal liver, HCH, and HCC were shown in Table 4. The corresponding MNC decreased significantly by 17.5 ± 7.1 (p < 0.05) in FPIRG. These in vitro and in vivo verifications demonstrated that the proposed DM-FPI scheme considerably removed severe out-of-plane artifacts caused by breathing motion on FPI, improved the accuracy in respiratory gating FPI. The proposed method could also characterize and distinguish the heterogeneous hemodynamics of the hepatic angiogenesis within two sections of liver cancer cells at the EOI and EOE phases.
Decrease in MNC of in vivo FPIRG compared with FPInoRG
| FPI | Normal† | HCH | HCC | |
|---|---|---|---|---|
| EOI phase | Time-related | 16.4 ± 9.3* | 14.1 ± 13.6 | 7.5 ± 8.8 |
| Intensity-related | 23.5 ± 6.2** | 12.5 ± 8.0* | 14.5 ± 9.4* | |
| Ratio-related | 13.4 ± 10.7 | 20.7 ± 18.1 | 29.9 ± 7.9** | |
| EOE phase | Time-related | 15.4 ± 8.6* | 16.2 ± 15.6 | 8.8 ± 11.4 |
| Intensity-related | 21.3 ± 7.6** | 13.4 ± 9.0 | 11.8 ± 7.8 | |
| Ratio-related | 15.1 ± 12.9 | 33.3 ± 20.7 | 27.7 ± 6.9** |
† normal hepatic perfusion experiments of healthy rabbits, * p< 0.05, and ** p < 0.01.
Discussion
Feasibility of DCEUS-based Dual-phase Multi-parametric FPI
This study used DCEUS video loops to reconstruct DM-FPI. In comparison with radiofrequency signal, nonlinear image processing algorithms may influence DCEUS video signal [34]. An impact is a possibility of losing the linear relation between the estimated and true local perfusions quantified by TICs [12, 34]. However, almost all commercial ultrasound platforms do not support access to radiofrequency data, so their acquisition is impractical for clinical applications. In practice, these nonlinear effects can be suppressed under an unsaturated gain and a wide dynamic range of system settings [39]. In this case, backscatter amplitudes of microbubbles are nearly proportional to their local concentration [8, 12]. This is what has been done in the current study (see Table 2); high dynamic ranges were selected to collect in vitro and in vivo TICs and to guarantee the efficient reconstruction of DM-FPI [34]. Additionally, due to various hepatic sampling depths in in vitro and in vivo validations and limitation of memory space in the used commercial ultrasound platforms, the frame rate and acquisition time were different in Table 2. But the major perfusion phases were collected using different transducers with similar acoustic parameter setting. Thus, the influences induced by various frame rate and acquisition time on parameter estimation and map reconstruction of AUC, WOR, and WIT were removed by normalized at the same dynamic range [8, 32] and TIC denoising methods [12, 14, 38]. Considering time-consuming in TIC model fitting [12, 38], a dual-weighted moving average filter [14] was used in this study.
Respiratory Gating using Derivative PCA Zero-crossing Dual-phase Detection
The maximum and minimum thresholds were utilized to detect respiratory phases in the estimated respiratory kinetics [19, 27, 28]. In previous studies, the respiratory kinetics was estimated using the intensity threshold strategies from the fundamental mode sequence to avoid the influence of microbubble kinetics on estimated respiratory kinetics [19, 27, 28]. In Figs. 2a and 2b, the two respiratory kinetic curves were estimated from the contrast mode sequence of single-mode DCEUS loops and the fundamental mode sequence of dual-mode DCEUS loops, respectively. Differences in these respiratory kinetic curves illustrated the impact of microbubble kinetics on estimated respiratory kinetics. However, the microbubble kinetics in Fig. 2a did not hamper the respiratory gating accuracy when the proposed derivative PCA zero-crossing dual-phase detection method was used. Some commercial ultrasound platforms only have the single contrast mode for DCEUS. In contrast to the intensity threshold strategy in [19, 27, 28], the derivative PCA zero-crossing dual-phase detection strategy enabled an accurate reconstruction of DM-FPI using single-mode rather than dual-mode DCEUS sequences.
Comparison with Other Machine Learning Algorithms
Previous studies had discussed the performance of in vitro and in vivo respiratory gating or motion compensation methods based on machine learning algorithms [27, 28, 31]. Mulé et al. and Gatos et al. described limitations of the negative component in PCA and the uncertain independence assumption in the independent component analysis through theoretical analyses [27, 31]. However, they failed to compare the accuracy of these estimation algorithms. Our previous study quantified the accuracy and computation efficiency of independent component analysis, PCA, and non-negative matrix factorization for respiratory kinetic assessment by considering the MSE and calculation time [32]. The MSE ratio of PCA versus independent component analysis was smaller by 2.7 (p < 0.05) and computation efficiency was quicker by 509.7 times (p < 0.01). Compared with non-negative matrix factorization, MSE of PCA was reduced by 0.3 (p < 0.05) and computation efficiency was improved by 20.8 times (p < 0.05). Thus, in comparison with independent component analysis and non-negative matrix factorization, the accuracy of estimated respiratory kinetics using PCA was improved and computation efficiency was the highest among those machine learning algorithms [32].
Accuracy and Feasibility of DCEUS-based Dual-phase Multi-parametric FPI with Respiratory Gating
The in vitro validation of respiratory gating for DCEUS-based DM-FPI aimed to provide information not available on the accuracy of those previous studies [17, 27, 28] under conditions of important out-of-plane 3D respiratory motion. Given an unknown ground truth in in vivo experiments, only Christofides and Renault et al. evaluated the respiratory gating accuracy through ideal simulation models under in-plane and slight out-of-plane motion conditions, respectively [17, 28]. However, their studies focused on the respiratory gating for DCEUS rather than FPI and did not consider severe 3D out-of-plane motion artifacts. Our previous in vitro studies validated the accuracy of FPI with respiratory motion compensation at in-plane condition [32] and 1D perfusion quantification with respiratory gating under out-of-plane condition [33] but severe out-of-plane motions were not considered for 2D FPI. Therefore, the respiratory gating precision of hepatic DM-FPI based on DCEUS was validated by considering multiple perspectives in this study for the first time. Moreover, under different levels of out-of-plane respiratory motions, the proposed scheme also could accurately identify the dual-phase DCEUS subsequence and well reconstruct the corresponding DCEUS-based FPI. The levels of motion artifacts were controlled by the transducer rotary displacements. Compared with FPInoRG, the decreases in MSE of FPIRG were range from 1189.5 ± 86.71 (p < 0.05) to 1893.9 ± 965.4 (p < 0.05) under the conditions from slight to serious respiratory motion artifacts. But the increases in correlation R of FPIRG were range from 0.2 ± 0.1 (p < 0.05) to 0.4 ± 0.2 (p < 0.01). These quantitative evaluations emphasized the fact that the noise level, misestimation, and various out-of-plane artifacts in FPIs induced by respiratory motion could be considerably decreased by the proposed respiratory gating DM-FPI scheme.
Characterization of Angiogenic Heterogeneity with Dual-phase Multi-parametric FPI
HCH and HCC are respectively the most prevalent benign [40] and malignant liver tumors [1]. Dual-phase FPIRG clearly characterized the hepatic angiogenesis in HCH and HCC at EOI and EOE phases (Figs. 8 and 9). Although abundant HCH cells were demarcated by a fibrous capsule [40], the massive HCH (size: more than 4 cm [40]) in this study clearly exhibited an undulating hemodynamic feature with an irregular border in the dual-phase FPIRG. Angiogenesis between the surrounding HCH and its central island of hepatocytes were also clearly characterized in the dual-phase FPIRG, which was consistent with histologic features of HCH in [40]. Angiogenesis in HCH and HCC exhibited similar hemodynamic features with relatively smaller WIT, higher AUC, and smaller WIR in the dual-phase FPIRG than those in the surrounding normal liver. Moreover, WIR and AUC in HCC angiogenesis were larger than those of HCH. As such, the angiogenesis of HCC presented a larger perfusion volume and a faster flow rate. These observations are consistent with HCH and HCC analyses but also complemented the hemodynamic analyses in [7]. Indeed, our results illustrated that the dual-phase FPIRG could identify tumors from the surrounding normal livers and distinguish benign HCHs from malignant HCCs.
Moreover, it is well-known that the tumor angiogenesis presents heterogeneity because of differences in cancer size, density, and architecture [1, 8, 41]. The heterogeneity of the angiogenesis of HCC was more important in Fig. 9 than that of HCH in Fig. 8. The 3D spatial heterogeneity in the angiogenesis of HCC was distinctly quantified and depicted in dual-phase FPIRG using various hemodynamic parameters within two anatomical sections. In comparison with the relative hypo-perfusion (i.e., hypoxia) zone in the No. 1 region (Fig. 9), angiogenic hyper-perfusion (i.e., hyperoxia) zones were characterized in the No. 2 region in FPIRG at the EOI phase and in the No. 2 and No. 3 regions in FPIRG at the EOE phase. The heterogeneous angiogenic hemodynamics in HCC and HCH were visualized and quantified using dual-phase FPIRG. Additionally, angiogenesis not only is an effective indicator to diagnose cancer but also becomes one of the principal targets of several antiangiogenic therapies [2, 3, 42]. Therefore, the proposed DM-FPI scheme is a potential method to identify hepatic tumors, evaluate therapeutic effectiveness, adjust drug doses, and modify treatments if necessary.
Comparison with Other Quantitative DCEUS and Functional Imaging Techniques
Several quantitative DCEUS techniques have been developed to directly quantify the microvascular hemodynamics. 1D TIC analysis techniques were proposed to qualitatively indicate perfusion differences within normal and lesion tissues, which were further developed to estimate single [43] and multi-parameters [44] to quantify perfusion differences. Goetti et al. and Zhang et al. proposed the perfusion classification method [16] and TIC-based factor analysis method [7] to characterize differences between benign and malignant focal lesions, respectively. Kuenen et al. [12] and Greis et al. [45] proposed 2D multi-parametric FPI to respectively quantify renal and hepatic microvascular hemodynamic distributions. Currently, researchers are focusing on improving the accuracy and robustness of FPI techniques and new clinical applications were proposed [8, 16]. The resolution and contrast of FPI for intratumoral angiogenesis were improved [8, 20]. Artifacts induced by slight out-of-plane motion were overcome for the abdominal DCEUS-based FPI in our previous studies [19, 32]. A 2D matrix transducer was used to produce 3D DCEUS [6] and volumetric perfusion parameters were then calculated to assess the antiangiogenic treatments [46], which overcame limitations of conventional quantitative DCEUS techniques without 3D perfusion information. However, these new 3D quantitative DCEUS techniques are limited by 1D volumetric data evaluation, the lack of 2D assessment of hemodynamic distribution, the serious alteration caused by breathing motion, and by the expensive ultrasound platforms required to produce those images [6, 46].
Moreover, other FPI approaches on account of nuclear magnetic spin imaging and computerized tomography are also widely used to diagnose and stage tumors and to monitor their response to treatments [47-49]. By contrast, these functional imaging techniques are limited by low time resolution and also disturbed by motion artifacts [48, 49]. The DCEUS-based FPI has the advantages of ultrasound imaging mentioned in the Introduction [10-12] but is also limited by low reproducibility and lack of standard scanning section due to artifacts of the sonographer. In a sense, these limitations in DCEUS-based FPI might be known as the better portability and flexibility. Compared with 1D, 2D, and 3D quantitative DCEUS methods and other functional imaging techniques, the proposed DM-FPI scheme has three important advanced features: the fully automatic respiratory gating, the dual-phase mode, the possibility of performing multi-parametric reconstructions under severe conditions of out-of-plane 3D respiratory motions. Thus, the proposed respiratory gating strategy, using PCA combined with derivative zero-crossing phase detection, made it possible to accurately identify the dual-phase DCEUS subsequences and to depict the hepatic hemodynamics within multi-anatomical sections. In a sense, the proposed DM-FPI scheme might balance the conventional known 2D and 3D quantitative DCEUS techniques and might be described as a 2.5D FPI technique. However, the detailed perfusion information between EOI and EOE phases was missed in the proposed scheme. A 3D respiratory gating FPI might overcome this limitation and its feasibility should be further studied at a bigger database in the further.
Conclusion
This study proposed a hepatic respiratory gating DM-FPI technique based on DCEUS utilizing derivative PCA. Accuracy and feasibility of the proposed technique were respectively illustrated through in vitro and in vivo hepatic perfusion validations under conditions of severe out-of-plane respiratory motions. Compared with approaches without respiratory gating, the proposed DM-FPI technique significantly removed out-of-plane artifacts and parametric misestimation induced by respiratory kinetics and improved the respiratory gating accuracy and robustness. Respiratory gating for DM-FPI could characterize and distinguish heterogeneous angiogenic hemodynamics within two sections in normal livers and in benign and malignant liver tumors. The proposed scheme may assist clinicians to identify benign and malignant hepatic tumors, characterize tumor grading and staging, evaluate therapeutic effectiveness, and guide appropriate therapies for liver cancers.
Acknowledgements
This work was partly supported by the National Key Program of Major Scientific Instrument Development of China (Grant No. 81827801) and the National Natural Science Foundation of China (Grant No. 81771854 and 11874049) from Ministry of Science and Technology.
Competing Interests
The authors have declared that no competing interest exists.
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Author contact
Corresponding authors: Diya Wang, Dr. Email: wang.diyacom; Qiang Su, Dr. Email: qiang.sumcgill.ca; Mingxi Wan, Prof. E-mail: mxwanxjtu.edu.cn
Received 2019-6-3
Accepted 2019-7-24
Published 2019-8-14
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