Patients

The prospective study was approved by the institutional review board and Health Insurance Portability and Accountability Act compliant. Prior to clinical examinations, written informed consent was obtained from each patient. A total of thirty-eight hypertensive patients with either essential hypertension (EH, n = 13) or renovascular hypertension secondary to atherosclerotic renal artery stenosis (ARAS, n = 25) were studied. ARAS was diagnosed given cross-sectional obstruction of more than 60% in renal artery using CT or blood velocity larger than 30 cm/sec using Doppler ultrasonography. Five ARAS patients had bilateral stenosis, resulting in a total of 30 stenotic and 20 contralateral kidneys. Only patients with serum creatinine level below 2.5 mg/dL were included in this study, to avoid potential nephrotoxicity of CT contrast media. For uniformity, all patients were treated with angiotensin-converting enzyme inhibitors or angiotensin receptor blockers anti-hypertensive therapy during inpatient studies in the Clinical Research and Trials Unit at St. Mary’s Hospital (Rochester, MN) while ingesting a fixed sodium diet (150 mEq/d). All patients underwent GFR measurement using firstly iothalamate clearance, and then CT two days later.

Renal function and blood pressure

As a reference, GFR was measured from plasma clearance of iothalamate meglumine (Conray, Mallinckrodt Pharmaceuticals, St Louis, MO), which has been widely adopted for GFR measurement in clinic trials [18]. For each patient, 0.5 mL iothalamate was subcutaneously injected, followed by three 30-minute blood sampling periods after oral hydration at 20 mL/kg. Total GFR was calculated from the time course of blood iothalamate concentration, as described previously [19,20]. Then the total GFR was apportioned by model-derived renal blood flow (RBF) to achieve the single-kidney GFR. Blood pressure was measured using automated oscillometric recording. To assess the serum creatinine level, blood samples were obtained from the inferior venal cava, as described previously [21]. Estimated GFR was quantified using the Modification of Diet in Renal Disease equation.

CT studies

CT studies were performed using a dual-source 64-slice helical multidetector CT scanner (Somatom Definition; Siemens, Forchheim, Germany). Imaging parameters were selected in line with technical prerequisites of modern state-of-the-art CT perfusion imaging [22] as described previously [17]. Briefly, following a central venous injection of Iopamidol-370 (0.5 mL/kg), dynamic CT imaging was conducted during coached intermittent respiratory suspension. A total of 45 acquisitions were acquired, including 35 scans distributed into three ≤20-sec breath-holds, and 10 additional scans with intermittent short breath-holds. The rotation time of the scanner was 0.5 second. The temporal resolution was 1 sec/scan during the vascular phase to capture the rapid contrast dynamics and 8 sec/scan during the tubular phase, during which contrast dynamics changed more slowly. Depending on patients’ body weight, tube voltage was set at 80, 100, or 120 kVp and current at 160 or 250 mAs with 24×1.2 collimation and 0 table feed. Four slices (7.2-mm thick) localized at kidney hilum were scanned in approximately 145 sec to follow the contrast bolus throughout the renal tubular system. After fifteen minutes, a helical scan was performed following another contrast injection to enhance the corticomedullary contrast for determination of cortical and medullary volumes. Imaging parameters were: tube voltage 100 or 120 kVp, tube current from 72 to 350 mAs, scan length from 25 to 40 cm, spatial resolution, 0.59×0.59×5 mm³, and spiral pitch factor 1.2. Image reconstruction for the DCE-CT and volumetric scans was performed using a B35s and B40f kernel, respectively.

Compartment model

To calculate single-kidney GFR and perfusion, we implemented a model originally developed to measure murine renal function from gadolinium dynamics captured using MRI. As shown in Fig 1, the kidney is simplified as a combination of blood vessels and renal tubules. Plasma flow carrying the iodinated contrast with the concentration of C_p(t) enters the kidney vessels and is filtered by the glomeruli, after which leaves the kidney from the papilla following tubular flow. The iodine concentrations in renal vessels, tubules distributed over the entire kidney, and papilla are represented by C_v(t), C_t(t), and C_out(t), respectively. The blood transit delay from abdominal aorta to kidney vessels is denoted as T_d. Notably, such delay was negligible in murine kidneys, but may not be in human kidneys, given the substantial difference in heart rate and blood kinetics [23,24]. The volume fraction of renal vessels is f. The perfusion, filtration, and efflux rate constants are k_perf, k_GFR, and k_out, respectively. The dynamics of C_v(t) and C_t(t) can be described by the following first-order differential equations: (1) (2) where C_p(t) is the arterial input function and calculated as C_a(t)/(1-Hct), where C_a(t) is the iodine concentration in inflow blood from abdominal aorta and Hct the assumed hematocrit (45%). The total iodine concentration in the renal papilla (C_out(t)) comprises of two components, one from perfusion (C_out^’(t)) and the other from tubular transit (C_out^”(t)). The perfusion component (C_out^’(t)) can be derived from C_p(t) and the papilla perfusion rate constant, which can be fitted from the early tubular phase (30 to 40s) prior to contrast arrival using Eq 1. Then C_out^”(t) was achieved by subtracting C_out(t) from C_out^’ (t) (Fig 2c, left). Inclusion of the papilla output curve C_out^”(t) enables timing of contrast outflow and accurate delineation of the kidney output curve, both of which are important for accurate model fitting. This approach has been found to be critical in mouse kidneys [15] and necessary in human kidneys.

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Fig 1. The modified two-compartment model.

The kidney is simplified as a combination of blood vessels and renal tubules. Plasma flow carrying the iodinated contrast enters the kidney vessels and is filtered by the glomeruli, after which leaves the kidney from the papilla following tubular flow. C_p(t) is the arterial input function; T_d is the blood transit delay; k_perf is the perfusion rate constant; C_v(t) is the iodine concentration in renal vessels; f is the volume fraction of renal vascular space; k_GFR is the normalized GFR; C_t(t) is the iodine concentration in the tubules distributed over the entire kidney; C_out(t) is the iodine concentration in the papilla; k_out is the iodine outflow rate constant.

https://doi.org/10.1371/journal.pone.0219605.g001

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Fig 2. DCE-CT and model fitting.

(a) Representative CT images acquired at baseline, and 4, 7, 11, 16, 46, 70, 100 sec post-contrast injection. (b) Three ROIs (left) manually traced on abdominal aorta (red), renal parenchyma (green), and papilla (blue), and their respective time attenuation curves (right). (c) Time attenuation curve in renal papilla decomposed into perfusion and filtration components (left), and model fitting to the time attenuation curve in the renal parenchyma, as well as the fitted vascular and tubular components.

https://doi.org/10.1371/journal.pone.0219605.g002

The total iodine concentration in the kidney can be calculated as C_tot(t) = C_v(t)·f + C_t(t). A total of five unknown parameters, k_perf, T_d, f, k_GFR, and k_out, were fitted, after which the single-kidney GFR (mL/min) and perfusion were calculated as: (3) (4) where V is 3D CT-measured renal volume and σ represents the blood/tissue partition coefficient for water, which is 0.9 [25,26]. Renal blood flow was subsequently quantified as the product of perfusion and volume.

Image analysis

Renal volumes were measured from the helical CT images using Analyze (Biomedical Imaging Resource, Mayo Clinic, MN). Kidneys were manually selected on CT images with sinus fat and major vessels excluded.

The DCE-CT images were post-processed using a Matlab (Mathworks, Natick, MA) module developed in-house. For each kidney, the slice with the largest renal cross-sectional area was analyzed. Images with in-plane motion were aligned using rigid registration. Specifically, a kidney mask was defined on one image without motion, after which the kidney edge was detected and propagated to other images. Then, on images showing in-plane motion, the kidney mask was manually shifted to align with the kidney. Images with off-plane motion were excluded. ROIs were manually selected on the abdominal aorta, renal parenchyma, and papilla, a 3-pixel-wide strip of the renal parenchyma where filtrate outflow converges. The ROI for the papilla was semiautomatically selected to facilitate image analysis as well as reduce inter-operator variability. Specifically, the kidney mask edge was detected and dilated using a 6×6 kernel. Then an approximate region containing the renal pelvis was manually selected, and the overlapping area of this region and the dilated kidney mask edge was set as the ROI for measurement of the contrast output function. These were used for measurement of arterial input function (C_p(t)), contrast dynamics in kidney (C_tot(t)), and contrast output function (C_out(t)), respectively (Fig 2b, left). A linear interpolation was used to equalize the distribution of sampled data points with an interval of 0.5 sec. The increase in CT signal from baseline was used to represent the concentration of iodine [27]. Due to motion artifacts in later scans, only time attenuation curves from 0 to 120 sec were used in the model fitting. The model fitting was performed by minimizing the sum of squares of fitting errors using the Levenberg–Marquardt algorithm. In order to test the goodness of fit, the coefficients of multiple correlation for the EH, stenotic, and contralateral kidneys were calculated. After measuring single-kidney GFRs, total GFR was quantified as the sum.

To assess the reliability of the compartment model in perfusion measurement, renal perfusion maps were additionally generated using a truncated singular value decomposition-based deconvolution algorithm [28] implemented in the OsiriX Lite software (version 10.0, Pixmeo, Geneva, Switzerland) [29]. CT images capturing the first pass within 20 sec after bolus injection were used in order to minimize the influence of renal filtration on perfusion measurement [30]. Then reference renal perfusion was quantified from the perfusion map using the same ROI defined in the model analysis. Since ignoring blood transit delay in the deconvolution algorithm is known to underestimate renal perfusion [28], the patient kidneys were divided into two groups by model-derived transit delay using a cutoff value of 1 sec. Then comparison of renal perfusion measured by the model and deconvolution was conducted for each group individually.

To determine the inter-observer reproducibility of ROI placement and subsequent model fitting of renal functional parameters, GFR and RBF measured by two independent operators in all EH and ARAS patients were compared using both correlation and Bland-Altman analyses.

Baseline characteristics of patients

All relevant data underlying the statistics as well as the extracted time attenuation curves from the CT images are shown in S1 Dataset in Supporting Information. As shown in Table 1, EH and ARAS patients had similar percentage of males, age, body mass index, and number of antihypertensive drugs. No difference in systolic, diastolic, and mean arterial pressure was observed between EH and ARAS patients. However, elevated serum creatinine level in ARAS patients indicated their impaired renal function. Both estimated and iothalamate clearance-measured total GFR were lower in ARAS patients.

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Table 1. Baseline characteristics of patients.

https://doi.org/10.1371/journal.pone.0219605.t001

Model fitting of DCE-CT data

Representative CT images of one EH kidney at baseline and different time intervals after contrast injection are shown in Fig 2a. The time attenuation curves in abdominal aorta (red), kidney parenchyma (green), and papilla (blue) were measured from manually traced ROIs (Fig 2b). The arterial input function shows an initial sharp peak, a second low peak due to contrast recirculation, and a gradual decrease thereafter. The iodine concentration in renal parenchyma is characterized by an initial increase due to perfusion, a slow rise because of glomerular filtration, and then a slight decrease as a result of outflow. Similar initial increase in iodine concentration is observed in the papilla because of perfusion, followed by a steady state during tubular transit, and subsequent rapid increase as a result of iodine inflow.

The DCE and volumetric CT scans yielded dose-length product values of 913.3 ± 294.8 and 339.6 ± 85.1 mGy·cm, respectively. Using a conversion factor of 0.0153 for the abdomen [31], the effective dose values of the DCE and volumetric scans were 13.8 ± 4.7 and 5.2 ± 1.3 mSv, respectively. Thus, the total effective dose of our CT scans is 19.0 ± 5.1 mSv, which is comparable or lower than other the dose of similar multiphasic abdominal CT scans [32].

The decomposition of papilla iodine concentration (C_out(t)) to the perfusion (C_out^’(t)) and filtration (C_out^”(t)) components are shown in Fig 2c (left). The experimentally-acquired raw and model-fitted time attenuation curves for the kidney parenchyma as well as its vascular and tubular components are shown in Fig 2c (right). The fitted curve showed an excellent agreement with the raw data, suggesting that the proposed compartment model faithfully depicts the kidney filtration process in human kidneys. In addition, the quantified coefficients of multiple correlation for the EH (0.94 ± 0.06), stenotic (0.93 ± 0.12), and contralateral (0.95 ± 0.07) kidneys were all close to 1, further supporting the reliability of model fitting.

Shown in Table 2 are the CT-measured kidney volume and the model-derived parameters. Stenotic kidneys had smaller volume (P<0.001), as compared to both EH and contralateral kidneys. While k_perf, T_d, and k_out were unchanged, f (stenotic, P = 0.010; contralateral, P = 0.005) and k_GFR (stenotic, P<0.001; contralateral, P = 0.038) fell significantly in both the stenotic and contralateral kidneys, as compared to EH kidneys.

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Table 2. Kidney volume and model-fitted parameters.

https://doi.org/10.1371/journal.pone.0219605.t002

GFR by CT and iothalamate clearance

In both EH and ARAS patients, total kidney GFRs by DCE-CT and iothalamate clearance were comparable (Fig 3a, left), and well correlated (Fig 3b, left, Pearson correlation coefficient r = 0.94, P<0.001). A good agreement between them (mean difference of 5.0±20.3 mL/min) was also observed in the Bland-Altman analysis (Fig 3c, left). The stenotic kidneys had lower CT-measured GFR (20.0 (8.4–26.6) mL/min, Fig 3a, right), as compared to the EH (40.4 (36.1–50.9) mL/min, P<0.001) and contralateral kidneys (41.2 (28.3–50.9) mL/min, P<0.001). The GFRs in the contralateral and EH kidneys were similar. Single-kidney GFRs by both methods were also similar (Fig 3a, right) and showed a good correlation (Fig 3b, right, r = 0.94, P<0.001). A good agreement was also observed in the Bland-Altman analysis (Fig 3c, right, mean difference, 2.5±12.2 mL/min).

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Fig 3. Validation of model-derived GFR by DCE-CT using iothalamate clearance.

(a) Total (left) and single-kidney (right) GFRs measured by DCE-CT and iothalamate clearance in EH and ARAS patients. (b) Correlation between DCE-CT and iothamate clearance in measuring total (left) and single-kidney (right) GFRs. (c) Bland-Altman analysis of total (left) and single-kidney (right) GFR measurements by DCE-CT and iothalamate clearance.

https://doi.org/10.1371/journal.pone.0219605.g003

Renal perfusion and blood flow

When the blood transit delay from abdominal aorta to kidney was under 1 sec, a good agreement in renal perfusion by the compartment model and deconvolution was observed, as shown by the correlation (Fig 4a left, r = 0.86, P<0.001) and Bland-Altman (Fig 4a right, mean difference, 1.4±101.2 mL/100g/min) analyses. However, with delay exceeding 1 sec, the deconvolution algorithm yielded smaller perfusion values than the compartment model, especially at high perfusion rates (Fig 4b). These observations are consistent with previous findings that this deconvolution approach underestimated perfusion values by ignoring the blood transit delay, which was accentuated with longer delays and high perfusion [28].

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Fig 4. Renal perfusion and blood flow by DCE-CT.

(a-b) Correlation (left) and Bland-Altman (right) analyses of renal perfusion derived from the deconvolution algorithm and model fitting in kidneys with blood transit delay below (a) and above (b) 1 sec. (c) Model-derived renal perfusion (left) and calculated renal blood flow (right) in all EH, stenotic, and contralateral kidneys.

https://doi.org/10.1371/journal.pone.0219605.g004

The DCE-CT measured renal perfusion and blood flow are shown in Fig 4c. The ARAS stenotic kidneys showed a 36.8% decrease in perfusion compared to the EH kidneys (Fig 4c left, 194.8 (162.0–290.2) vs. 308.1 (261.6–385.7) mL/100g/min, P = 0.001). No change was observed in perfusion of the contralateral kidneys (280.8 (191.8–310.6) mL/100g/min) compared to the EH kidneys. The calculated RBF in the stenotic kidneys (Fig 4c right, 182.0 (130.0–274.1) mL/min) was found decreased by 60.7% and 60.1%, as compared to the EH (463.3 (398.1–639.0) mL/min, P<0.001) and contralateral (456.2 (282.3–579.6) mL/min, P<0.001) kidneys, respectively.

The correlation and Bland-Altman analyses showed that inter-observer bias and variation in measurement of the GFR (Fig 5a, r = 0.97, P<0.001; mean difference, 0.3±7.7 mL/min) and RBF (Fig 5b, r = 0.96, P<0.001; mean difference, 5.4±73.1 mL/min) were minimal, suggesting good reproducibility of ROI selection and model fitting.

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Fig 5. Inter-observer reproducibility of the compartment model in measuring renal functional parameters.

(a-b) Correlation (left) and Bland-Altman (right) analyses of the GFR (a) and RBF (b) measured by two independent observers.

https://doi.org/10.1371/journal.pone.0219605.g005

Simulation results

Representative model-derived time attenuation curves in the renal parenchyma (black lines) as well as its vascular (red lines) and tubular (green lines) components with (solid lines) and without (dashed lines) blood transit delay as a model parameter are shown in Fig 6a. Overall, the fitted curve (solid black line) in the renal parenchyma with transit delay provided a better fitting to the experimentally-acquired raw data (circles) compared to the one without transit delay (dashed black line), especially at the vascular peak. Without accounting for the transit delay, the fitted vascular and tubular curves also showed different amplitudes and shapes compared to those fitted with the transit delay. Specifically, the peak amplitude of the vascular curve (dashed red line) was lower, and underestimated the raw data at vascular peak. Because the vascular curve was wider, it also led to a lower tubular curve (dashed green line) in order to match the raw data at tubular phase. As a result, the measured renal perfusion was lower (Fig 6b, EH, 15.0%; stenotic, 13.5%; contralateral, 17.9%) and the normalized GFR underestimated (Fig 6c, EH, 7.2%; stenotic, 8.3%; contralateral, 5.9%) in all kidneys.

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Fig 6. Impact of blood transit delay on estimated renal perfusion and GFR.

(a) Representative model fitting of experimentally-acquired data with and without taking into account the blood transit delay from abdominal aorta to kidney. The model-fitted vascular and tubular time attenuation curves are also shown. (b, c) Graphs show changes in model-derived renal perfusion (b) and normalized GFR (c) by neglecting the blood transit delay. Each line represents an individual kidney.

https://doi.org/10.1371/journal.pone.0219605.g006

The impact of ignoring the blood transit delay T_d on estimated renal perfusion and GFR at different fitting ranges and temporal resolutions is shown in S1 and S2 Figs, respectively. In all three simulations, renal perfusion and GFR ratios were smaller than 1.0 at all fitting ranges from 50 to 120 s, indicating that neglecting T_d led to an underestimation in renal functional parameters. Similar findings were observed when different temporal resolutions ranging from 0.5 to 3.5 s/scan were used (S2 Fig). Therefore, the necessity of including T_d as an unknown parameter in the model fitting for reliable estimation of renal function is independent of the fitting range and temporal resolution.

The impact of fitting-range on measurement of perfusion and normalized GFR in EH, stenotic, and contralateral kidneys is shown in Fig 7. The averaged renal perfusion and normalized GFR showed small variations with different fitting ranges from 50 to 120 sec, indicating a robust fitting by the two-compartment model. However, a smaller fitting range led to a larger variation, especially in normalized GFR. In order to maintain a standard deviation under 10%, a minimum fitting range of at least 80 sec seems to be required. This permits elimination of 9 out of 45 scans, thereby decreasing the patient dose by about 20%.

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Fig 7. Impact of model fitting range on estimated renal perfusion and GFR.

The averaged renal perfusion and normalized GFR as well as their respective standard deviation in EH (a), stenotic (b), and contralateral (c) kidneys with different fitting ranges from 50 to 120 sec. A smaller fitting range led to a larger variation, especially in normalized GFR.

https://doi.org/10.1371/journal.pone.0219605.g007