2.1.

Distance and Incident Angle Extended Light Transmission Model

A schematic overview of light propagation for IVOCT imaging is shown in Fig. 2. The light emitted from the catheter first travels through the flush medium before reaching the arterial wall with a distance denoted as $x_t$. At the interface between the flush medium and the arterial wall, both reflection and refraction occur. $\theta$ represents the incident angle of the light entering the arterial wall. $\mathrm{\Delta }x$ represents the light transmitting distance of the refracted light beam inside the arterial tissue. For the convenience of explanation, we introduce $x=x_t+\mathrm{\Delta }x$.

Fig. 2

Light transmission. $x_{\mathrm{t}}$ denotes the distance between the light source and the arterial wall, $\theta$ is the incident angle of the light beam.

2.2.

Parameter Estimation of the Linear Model with Hierarchical Linear Regression

2.2.1.

Hierarchical linear regression

Hierarchical linear models are specifically utilized for data with hierarchical structures.²⁴ Here, a hierarchical linear model is designed to analyze the potential relationship between OCT image intensities and three factors: distance, $(x)$; angle, $\ln Tr(\theta ,n_i,n_t)$; and the constant term $C(I_0,{\mu }_{\mathrm{b}})$. The linear model for regression is

Eq. (5)

$$\ln I_{\mathrm{b}}(x)={\beta }_0+{\beta }_1·x+{\beta }_2·\ln \mathrm{Tr}(\theta ,n_{\mathrm{i}},n_{\mathrm{t}}).$$

In order to keep the consistency of the notations, the parameters were denoted as ${\beta }_0$, ${\beta }_1$, and ${\beta }_2$. The A-lines can be hierarchized into different frames, which in turn can be hierarchized into different pullbacks. Based on this observation, a three-level linear model is considered for this study (see Fig. 3).

Fig. 3

Multilevel linear model.

2.3.

Compensation

The linear model that describes the effect of the catheter position can also be used for the compensation of this effect.

Based on the linear regression model, the primary goal for the compensation is to normalize the IVOCT image intensities within the superficial layer of the nonpathological artery. This can be achieved with the following equation involving the regression result:

Noting that the following mathematical equation holds

3.1.

Hierarchical Linear Regression

The hierarchical linear regression considers three fixed effects and two random effects. The $F$-tests result for each of the fixed effects specified in the model indicate that all three effects contribute to the model statistically significantly with $p<0.001$.

Table 3 shows the results of the fixed model. It was found that the constant related to light source (${\beta }_0=6.5121$, $\mathrm{SE}=0.1615$, $p<0.001$), the distance between catheter and artery wall (${\beta }_1=0.0023$, $\mathrm{SE}=0.0000$, $p<0.001$) and the logarithm of “Fresnel” transmission ratio (${\beta }_2=2.8178$, $\mathrm{SE}=0.0725$, $p<0.001$) were significant predictors.

Table 3

Estimates of fixed effects.a

Table 4 shows the results for the two random factors and residual covariance matrices. Results indicate that both the defined random effects—the frame number ($Nu=0.0060$, $\mathrm{SE}=0.0007$, $p<0.001$) and pull-back number ($Nu=0.2342$, $\mathrm{SE}=0.1173$, $p<0.05$)—contribute to the covariance statistically significantly with almost two thirds of the total variance. However, the influence of the frame number is relatively very small ($\sim 1.6\%$) compared to the other contributors. Based on this observation, this random effect can be ignored during modeling.

Table 4

Estimates of covariance parameters.a

The histogram of the residual ($ϵ=0.1276$, $\mathrm{SE}=0.0006$, $p<0.0001$) is distributed symmetrically around zero with a mean value of $-2.01\mathrm{E}-11$ and a standard deviation of 0.3568, thus indicating the model can fit the data well.

3.2.

Compensation

With the results of the linear regression, images can be compensated using Eq. (10) proposed in Sec. 2.3. Figure 4 demonstrates the compensation of IVOCT images of nonpathological arteries. The nonuniform image intensities behind the lumen border and even a small shadow artifact on the lumen wall were compensated. The nonuniform image intensities and even a small unusual shadow on the lumen wall were compensated.

Fig. 4

(a and c) The images before compensation and (b and d) the compensated images. The image in (a) is a clear example of the effects caused by the eccentric position of the catheter, the compensated image (b) shows more evenly distributed intensities around the artery wall. In the second example (c), the light intensities are more or less homogeneous but there is information missing at 1 o’clock. (d) After compensation, the shadow region is removed.

4.1.

Foam Cells Visualization

The compensated images are compared with histological cross sections. Selected frames from two ex-vivo OCT pullbacks on explanted hearts²⁶ were used. OCT imaging was performed with the Ilumien PCI Optimisation system and a C7 Dragonfly Imaging Catheter of LightLab Imaging, St. Jude Medical, Minnesota. The proximal 5 cm of the vessels were cut out and standard paraffin embedding was performed. For every $200\mu \mathrm{m}$, $3\text{-}\mu \mathrm{m}$-thick sections were cut and stained with haematoxylin–eosin. These slices were annotated by a pathologist and matched with the corresponding OCT frames based on anatomical landmarks.

Two examples with bright spots are given in Fig. 5. In Figs 5(a)–5(c), the image intensities marked with red arrows were darkened due to the residual of blood within lumen. In the compensated image, the darkened regions were compensated and the edges between the calcified region and the fibrous region are more clear. In Figs. 5(d) and 5(e), the image regions near side branches were darkened due to the eccentric catheter position. The foam cells, marked with the red arrows, are more accentuated in the compensated image than in the original image.

Fig. 5

Demonstration of the effect of compensation. (a–f) From right to left are histology images, original IVOCT images, and compensated images. In the histology images, red arrow indicates the location with form cells, and stars mark the calcified lesions as landmarks. The original and the compensated images are displayed at the same contrast and brightness level, and the red arrows mark noticeable regions for comparison.

4.2.

Bioresorbable Vascular Scaffold Strut Detection

In order to examine the impact of compensating images on automated image segmentation, it is tested on the BVS strut detection, as proposed by Wang et al.¹⁸ For this purpose, eight pullbacks were used, which were acquired with a C7XR swept-source OCT system and a C7 Dragonfly Imaging Catheter (St. Jude Medical, Minnesota) at 6 to 12 months poststenting. All the stents are the ABSORB 1.1 BVS (Abbott Vascular, Santa Clara, California). The manual drawn ground truth (GT) data contains 7933 black cores in total. The experiment is carried out with the in-house developed software QCU-CMS (LUMC, Leiden, The Netherlands).

The compensated pullbacks were rescaled linearly by aligning the 99.5 percentile value of the histogram to that of the original pullbacks, thus the same detection scheme can be applied, as it is described in the work of Wang et al.¹⁸ The results were evaluated by counting the true positive (TP), the false positive (FP), and false negative (FN), and the $F$-score was calculated as the measurement of the detecting performance.²⁷

With the described data and experimental settings, the compensated images were used for automatic BVS strut detection. The detection results can be seen in Table 5, where the outperformed F-score is marked with bold font. The compensation algorithm improves the BVS struts detection for 6 out of 8 pullbacks by 1.0 to 6.6 percent in F-score. An example of an improved BVS detection image can be seen in Fig. 6. In QCU-CMS, all the delineations are displayed in the original image. In order to make a clear distinction, the delineations of the GT, the detection results with the original images, and the detection results with the compensated images are shown separated in A, B, and D. The box-and-whisker plot in C shows the intensity percentile within 10 BVS black core regions.

Table 5

The stent struts detection results.

Fig. 6

An example of image with improved BVS detection. (a) The cross section with GT BVS delineated with cyan color. (b) Detection results with the original image delineated with white color. (d) Detection results with the compensated image delineated with white color. (c) Within each black core of the GT, the percentile of both original and compensated image can be seen.

5.1.

Hierarchical Linear Regression

The statistic analysis focuses on intima-media regions on the artery wall, thus the tissue-dependent effects were minimized in the study. Similar region selection criteria have been used by Courtney on IVUS images.⁷ The statistical results show that the amount of light that enters the artery wall is significantly related to the catheter position. In the linear model, an angle-related transmission ratio has been used to model the trend. The trend of this transmission ratio is conforming to empirical observations.

As the angle of incidence increases, the IVOCT intensities decrease accordingly. The more the angle of incidence approaches to a critical angle, the faster the IVOCT intensities decrease. When the angle of incidence approaches this critical angle, light propagation into the tissue in the artery wall is limited. This can explain the “signal dropout” reported by van Soest et al.⁵ When the incident angle becomes equal or even larger than a critical angle, there is hardly light entering the artery wall, and the transmission ratio will approximate to zero. This results in the appearance of disconnecting tissue along the arterial wall, which has been reported as dissection artifacts in an IVUS study by Mario et al.¹⁰ Due to the lack of valid signal, these artifacts cannot be compensated.

As random variables, the pullback number and frame number contribute to the hierarchical linear model significantly in terms of covariance. The covariance contribution of frame number is relatively small enough to be ignored. The covariance of the pullback number occupies almost two thirds of the total covariance. Since the same flush medium was used, this suggests that the distance-dependency can differ between IVOCT imaging catheters. This confirms the statement of van Soest et al. that the parameters of catheters differ from each other.²²

The range of the estimated incident angles in the experiment is relatively small due to the elliptical shape of the artery wall, which is an inevitable issue of in-vivo IVOCT data. Since the angle related term is between 0 and 1, the logarithm operation can enlarge the range of the transmission term in the linear model. Another potential issue related to the angle estimation is that the angle of incidence has been estimated with 2-D IVOCT images: the best estimation that can be achieved at present. The estimation can approximate the spatial angle well because the imaging catheter has elasticity to resist over-bending and can thus be assumed parallel to the longitudinal direction of the artery. Nevertheless, it would be interesting to measure the angle of incidence in 3-D in a future study.

5.2.

Compensation

The compensation of the intensities in the OCT images can enhance the visualization of arterial tissues in IVOCT images. An eccentric position of the catheter can result in inhomogeneous intensity in homogeneous tissue, which requires the contrast and brightness levels to be constantly adjusted during visual inspection. Our proposed compensation algorithm improves the visualization by balancing the signal levels within each pullback, which can be seen in both in-vivo (Fig. 4) and ex-vivo images (Fig. 5).

The principle of the algorithm is that for each pixel at the lumen boundary, the same amount of light enters the tissue, such that further analysis can be carried out without the bias caused by the catheter position. It is designed to overall enhance the absolute intensities for each A-line rather than changing the relative trend. Therefore, it will not affect the parameters like attenuation and backscatter. This is why the proposed algorithm preserves the dark trend within regions with weak backscattering (calcified lesion, dark square inside BVS stent struts, etc) or behind tissue with high attenuation (foam cells, e.g.).

Noting Figs. 5(b)–5(d), shadow artifacts caused by the residual blood in the protective sheath were compensated as well. This is because our compensation algorithm compensates the total energy behind the lumen border for each A-line. The shadow artifacts caused by factors within the lumen, e.g., residual blood and thrombosis, may be the result of a sudden drop of the total energy compared to A-lines in the neighborhood. Therefore, normalizing the total energy can compensate such local shadow artifacts as well.

In the BVS strut detection experiment, the overall result shows that the compensation algorithm can improve the performance of the BVS struts detection. As it is shown in Fig. 6(c), the box-and-whisker plot of the percentile values within the black cores, we can observe that the percentiles in the compensated image are lower than those in the original images. Furthermore, it is worth noting that the lower percentiles over all the black cores are more condensly distributed. This can be the main reason that the proposed algorithm improves detection, since the lower percentiles are used as thresholds in the BVS strut detection.¹⁸

Meanwhile, there are two pullbacks with lower $F$-score, pullback 1 and 8. The first pullback was from a patient with a previously implanted metal stent strut followed by a BVS stent treatment, which results in multiple artificial layer structures. This also explains the large amount of the FP in the detection results on the original images in Table 5. The FP ratio on the compensated images is even higher, and this may be because the deeper layer structures are enhanced. Despite a higher FP ratio, the detection with the compensated images gives a higher TP rate. In the eighth pullback, the $F$-score with the compensated image is slightly lower than that with the original images, but it should be noted that both $F$-scores are already very high.

5.3.

Limitations

There are two catheter-related terms for modeling the IVOCT signal. One is the confocal function and the other is the spectral coherence term. Both terms can be different for different catheters. This can be the reason for the variation that lies in the estimated intercept for the hierarchical regression results. As a result, the compensation factor can be different as well. Noting that the compensation factor serves mainly to normalize the total energy of the incident light onto the arterial tissue, this difference causes only a shift of the histogram of the compensated pullback rather than the shape of the histogram. In these situations, it would be sufficient to apply the compensation algorithm with a fixed “average” factor to remove the bias caused by the catheter position. For the quantification analysis on the data from different pullbacks,^19,20 the compensating images with fixed factor can be still useful to remove the bias caused by the catheter position, but for further comparison of the statistical numbers, the differences caused by different catheter parameters should be taken into account using statistical tools, such as hierarchical models and so on. It can be useful to characterize the variance caused by different catheters and model it into the compensation method. However, in practice, this will be difficult since most hospitals will not do additional calibration measurements of the catheter before or after the procedure.

Another limitation regarding the catheter-related parameters is that the overall distance-dependent decreasing trend is implemented as a linear regression model after taking the logarithm. So, the algorithm is designed to compensate the general descending trend rather than the Gaussian-shape variation in the confocal function. Taking the numbers reported in the work of Ughi et al.¹¹ as an example, $z_0\approx 1.5\mathrm{mm}$ (focal point) and $z_{\mathrm{R}}\approx 2\mathrm{mm}$ (Rayleigh length), the confocal function $T(x)$ at depth $x=4\mathrm{mm}$ equals to 0.625. After the overall linear decreasing trend is compensated, the variation of this term should be around 1 with a variation of $\pm 18\%$. That is to say, the total incident light is ether overestimated or underestimated by about 18%. For a full depth of 2 mm, the variation of intensities of each pixel can be 0.045%, which is relatively small.

5.4.

Future Directions

In this paper, the compensation algorithm shows its potential to be a preprocessing step for automatic BVS stent strut detection. For further incorporating the algorithm into the standard BVS detection workflow, more validation studies are needed, thus the parameters can be further optimized with the compensated images. Meanwhile, it is interesting to see if the compensation algorithm can improve the automatic detection of metal stent struts¹⁵ as well. Further experiments will be carried out for the metal stent strut detection in the future.