Comparative study of glenoid version and inclination using two-dimensional images from computed tomography and three-dimensional reconstructed bone models

Article information

Clin Shoulder Elb. 2020;23(3):119-124
Publication date (electronic) : 2020 September 1
doi : https://doi.org/10.5397/cise.2020.00220
Department of Orthopedic Surgery, School of Medicine, Catholic University of Daegu, Daegu, Korea
Correspondence to: Jun-Young Kim Department of Orthopedic Surgery, School of Medicine, Catholic University of Daegu, 33 Duryugongwon-ro 17-gil, Nam-gu, Daegu 42472, Korea Tel: +82-53-650-3068, E-mail: dr.junyoung@gmail.com
Received 2020 August 4; Revised 2020 August 24; Accepted 2020 August 24.

Abstract

Background

This study was performed to compare glenoid version and inclination measured using two-dimensional (2D) images from computed tomography (CT) scans or three-dimensional (3D) reconstructed bone models.

Methods

Thirty patients who had undergone conventional CT scans were included. Two orthopedic surgeons measured glenoid version and inclination three times on 2D images from CT scans (2D measurement), and two other orthopedic surgeons performed the same measurements using 3D reconstructed bone models (3D measurement). The 3D-reconstructed bone models were acquired and measured with Mimics and 3-Matics (Materialise).

Results

Mean glenoid version and inclination in 2D measurements were –1.705º and 9.08º, respectively, while those in 3D measurements were 2.635º and 7.23º. The intra-observer reliability in 2D measurements was 0.605 and 0.698, respectively, while that in 3D measurements was 0.883 and 0.892. The inter-observer reliability in 2D measurements was 0.456 and 0.374, respectively, while that in 3D measurements was 0.853 and 0.845.

Conclusions

The difference between 2D and 3D measurements is not due to differences in image data but to the use of different tools. However, more consistent results were obtained in 3D measurement. Therefore, 3D measurement can be a good alternative for measuring glenoid version and inclination.

INTRODUCTION

Determining the appropriate orientation and location for glenoid components and assessing glenoid bone loss are very important for successful reverse total shoulder arthroplasty (RTSA) [1], because malpositioning of the glenoid component can result in early component loosening, failure, and instability [2,3]. Therefore, precise evaluation for glenoid version and inclination is essential for preoperative RTSA planning procedures.

Conventional two-dimensional (2D) computed tomography (CT) images have been used as the gold standard to evaluate glenoid version and inclination [4,5]. However, the accuracy of measurement based on 2D images from CT scans (2D measurement) depends on factors of the scapula plane, which can change based on patient positioning and scapula orientation (rotation or abduction) [6]. Furthermore, the results of 2D measurement can differ depending on choice of axial or coronal plane. Recently, several studies have indicated that measurement using three-dimensional (3D)-reconstructed bone models (3D measurement) for glenoid version and inclination is more accurate than 2D measurement [4,7,8]. More advanced analysis using software allows analysis of the scapula regardless of orientation [9]. Therefore, this study was performed to compare glenoid version and inclination in 2D and 3D measurements.

METHODS

Ethical Approval

This study was approved by the Institutional Review Board of School of Medicine, Catholic University of Daegu (IRB No. CR-19-090-L). Informed consent was obtained from all patients included in this study, who agreed to study publication including use of radiographic images.

Demographic Data

The population comprised 30 patients (7 males and 23 females) who had undergone conventional CT scans with the GE Revolution CT system (GE Healthcare, Little Chalfont, UK) in our hospital between May 2018 and September 2019. The slice thickness of each image was 2.0 mm. The underlying diseases were cuff tear arthropathy (23 cases), osteoarthritis (two cases), avascular necrosis of the humeral head (two cases), nonunion after proximal humerus fracture (two cases), and rheumatoid arthritis (one case). The mean age was 73 years (range, 58–86 years). Two orthopedic surgeons (CHC and DK) measured glenoid version and inclination three times with 2D measurements, and another two orthopedic surgeons (JYK and HCK) performed the same using 3D measurements. A specialist and a resident were assigned to each group to account for ability and career knowledge.

2D Measurement

The 2D axial and coronal images from CT scans were used to measure glenoid version and inclination, respectively. For measuring glenoid version, we first marked two landmarks: (1) the center of the glenoid fossa and (2) the most medial location of the scapula on the first axial image below the coracoid process of the glenoid. This location represents the diameter of the glenoid, as this is where it is largest considering the anatomy of the glenohumeral joint and 2-mm slice thickness. Second, we drew a transverse line between the two points to define the anatomical axis of the scapula [10]. Third, we drew a straight line between the anterior and posterior margins of the glenoid fossa. Finally, we measured the angle between the two lines (Fig. 1A); a positive value indicated anteversion. Conversely, a negative value indicated retroversion.

Fig. 1.

Two-dimensional measurement of glenoid version and inclination. (A) Glenoid version. (B) Glenoid inclination.

For measuring glenoid inclination, a line was initially drawn along the most inferior margin of the supraspinatus fossa after selecting the coronal plane of the glenoid with the largest diameter [11]. Second, we drew a straight line between the superior and inferior margins of the glenoid fossa in that same coronal plane. Finally, we measured the angle between the two lines (Fig. 1B).

3D Measurement

The 3D measurement comprised the following four steps: (1) segmentation and 3D bone model reconstruction, (2) creation of a best-fit circle and sphere and identifying the center of the glenoid fossa, (3) creating three reference planes, and (4) measuring glenoid version and inclination. We used Mimics (Materialise, Leuven, Belgium) for 3D bone model reconstruction and 3-Matic (Materialise) for 3D measurement.

Segmentation and 3D bone model reconstruction

Axial and coronal images from CT scans were formatted as Digital Imaging and Communications in Medicine (DICOM) image files. We used Mimics to create the 3D reconstructed bone models as follows. First, the threshold level was selected based on Hounsfield units to mark the skeletal region in the CT images. Second, the boundary of the skeletal region was adjusted using the split mask function. Third manual mask editing was conducted to fill the holes on the surface of the skeletal region. Fourth, a 3D-reconstructed model was created. Finally, wrapping and smoothing techniques were applied to decrease the surface roughness of the 3D reconstructed model [12].

Best-fit circle and sphere creation and identification of the center of the glenoid fossa

We created the anatomical best-fit circle and sphere to determine the center of the glenoid fossa. First, several points on the margin of the glenoid were marked (Fig. 2A). Second, we set the best-fit circle based on the identified points (Fig. 2B). The best-fit circle was determined by production of a circle based on the coordinates of the points above the glenoid margin with as little error as possible. Third, the inner surface of the glenoid fossa was marked (Fig. 2C). Fourth, we set the best-fit sphere based on the coordinate values of the glenoid inner surface (Fig. 2D). Finally, we drew a line between the center of the circle and sphere and marked the center of the glenoid fossa by extending the line (Fig. 2E).

Fig. 2.

Making best-fit circle and sphere, and finding out the center of glenoid fossa. (A) Several points on the margin of glenoid is marked and connected. (B) Best-fit circle. (C) Inner surface of the glenoid fossa is marked. (D) Best-fit sphere. (E) The center of the glenoid fossa.

Reference planes

The scapular anatomical plane (SAP) was defined as the coronal plane containing the following three landmarks: (1) the center of the glenoid fossa, (2) the most inferior spot of the scapula body, (3) the intersection of the scapula spine and medial border (3rd point) (Fig. 3A) [2]. The axial anatomical plane was determined as that passing through the 3rd point and glenoid center while perpendicular to the SAP (Fig. 3B). The sagittal anatomical plane was defined as that passing through the glenoid center while vertical to the SAP and axial anatomical planes (Fig. 3B).

Fig. 3.

Making three reference planes. (A) Three landmarks. (B) Three reference planes.

Measurement of glenoid version and inclination

We defined the anatomical axis as the line connecting the centers of the best-fit circle and sphere. Glenoid version was described as the angle between the anatomical axis and SAP (Fig. 4A). Glenoid inclination was the angle between the anatomical axis and the axial anatomical plane (Fig. 4B) [2,9].

Fig. 4.

Measurement of glenoid version and inclination. (A) Glenoid version is defined as the angle between the anatomical axis and scapular anatomical plane. (B) Glenoid inclination is decided as the angle between the anatomical axis and axial anatomical plane.

Statistical Analysis

Independent t-test and Pearson’s correlation analysis were applied to compare the results between 2D and 3D measurements, including glenoid version and inclination. IBM SPSS ver. 19.0 (IBM Corp., Armonk, NY, USA) was utilized for statistical analysis, with P<0.05 indicating statistical significance.

RESULTS

Mean glenoid version and inclination in 2D measurements were –1.705º (standard deviation [SD], 4.73º) and 9.08º (SD, 9.76º), respectively, while those in 3D measurements were 2.635º (SD, 3.78º) and 7.23º (SD, 3.99º) (Table 1). These results indicate statistically different mean glenoid version and inclination between the two measurement methods. The result also indicates that 3D measurement is more consistent than 2D measurement. Intra- and inter-observer reliabilities were determined for glenoid version and inclination with 2D and 3D measurements. The intra-observer reliability for glenoid version and inclination in 2D measurement was 0.605 and 0.698, respectively, while that in 3D measurement was 0.883 and 0.892 (Table 2). The inter-observer reliability for glenoid version and inclination in 2D measurement was 0.456 and 0.374, respectively, while that in 3D measurement was 0.853 and 0.845, respectively (Table 3). These outcomes show higher reliability of 3D measurement than that of 2D measurement.

Mean and standard deviation in two different measurement methods

Intra-observer reliability

Inter-observer reliability

DISCUSSION

Preoperative assessment of glenoid version and inclination is important for implantation in RTSA. Conventional 2D images from CT scans have primarily been used to evaluate these values. However, measurement of glenoid version and inclination on radiographic images from CT scans have several drawbacks [6,13-16]. The first is that reference planes can be determined differently based on patient position and scapula orientation. Second, the reference plane setup can differ based on wear pattern and asymmetric shape of the glenoid. Third, it is more difficult to precisely set the reference planes with thicker CT slice thickness. Fourth, when measuring glenoid version and inclination, indistinct shapes of anatomical landmarks can result in measurement errors. Because of these shortcomings, 3D-reconstructed bone models (3D measurement) have been introduced for measuring glenoid version and inclination. Several studies have shown that 3D measurement of glenoid version and inclination was more accurate than 2D measurement [4,7,8]. Despite the advantages, 3D measurement is more costly and time consuming than 2D measurement. In this study, 2D measurement in each case could be completed within an average of 3 minutes, while that of 3D measurement required about 15 minutes.

In this study, difference was shown in mean values calculated by the two measurement methods. The results also showed differing intra- and inter-observer reliability, with more consistent values using 3D measurement. However, it is difficult to determine if 3D measurement is superior to 2D measurement based on assessment by different measurement tools. As 2D images from CT scans are attained in the supine position, it is highly likely that scapula orientation is reflected. Furthermore, the outcomes of 2D measurement can differ depending on use of the axial or coronal plane. However, in 3D measurement, scapula orientation and patient position are not considered because of the use of 3D-reconstructed bone models.

In addition, the 2D and 3D measurements suggest different outcomes due to the difference in measurement space. In 2D measurement, the angle between two lines is utilized to measure glenoid version and inclination. However, as the lines are measured by shadows projected on the 2D plane, they do not reflect accurate anatomy. In comparison, in 3D measurement, glenoid version and inclination are measured as the angle between a line and plane and is more likely to represent reality because the line is not projected on the 2D plane.

In a previous study [2], the inner surface of the glenoid fossa was assumed to be a part of the sphere, and glenoid version and inclination were measured using the best-fit sphere method. However, because the inner surface of the glenoid fossa is not a perfect sphere, error can result when determining the precise location of the glenoid center. To reduce the probability of this error, we created a best-fit circle based on the coordinates of several points in the glenoid margin. Then, the line connecting the centers of the sphere and circle was set as the anatomical axis, and the point where the extension of this axis met the inner surface of the glenoid was defined as the glenoid center. If the margin of the glenoid is distorted due to other causes such as osteophytes or deformities, there is a possibility for an associated error in identification of the glenoid center. However, it is thought that a more accurate glenoid center can be determined when using the best-fit circle method "together" rather than the best-fit sphere method alone.

This study had several limitations. First, we did not consider patient positioning or scapula orientation. Second, there may be observation error in setting the anatomical axis and several coordinate values in 3D measurement. Third, the population of the study was collected from a single hospital and was small. Fourth, only static images that did not reflect range of motion were used. Finally, the difference in measurer abilities according to experience was not considered.

In summary, the difference between 2D and 3D measurements is not due to differences in image data but to use of different tools. However, more consistent results were obtained in 3D measurement. Additionally, detailed analysis of preoperative 3D images could be very helpful during operation. Therefore, 3D measurement can be a good alternative for measuring glenoid version and inclination.

Notes

Financial support

None.

Conflict of interest

None.

References

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Article information Continued

Fig. 1.

Two-dimensional measurement of glenoid version and inclination. (A) Glenoid version. (B) Glenoid inclination.

Fig. 2.

Making best-fit circle and sphere, and finding out the center of glenoid fossa. (A) Several points on the margin of glenoid is marked and connected. (B) Best-fit circle. (C) Inner surface of the glenoid fossa is marked. (D) Best-fit sphere. (E) The center of the glenoid fossa.

Fig. 3.

Making three reference planes. (A) Three landmarks. (B) Three reference planes.

Fig. 4.

Measurement of glenoid version and inclination. (A) Glenoid version is defined as the angle between the anatomical axis and scapular anatomical plane. (B) Glenoid inclination is decided as the angle between the anatomical axis and axial anatomical plane.

Table 1.

Mean and standard deviation in two different measurement methods

Variable Glenoid version (°) Glenoid inclination (°) p-value
2D measurement –1.705±4.73 9.08±9.76 <0.05
3D measurement 2.635±3.78 7.23±3.99 <0.05

Values are presented as mean±standard deviation.

2D: two-dimensional, 3D: three-dimensional.

Table 2.

Intra-observer reliability

Variable Glenoid version Glenoid inclination
2D measurement 0.605 0.698
3D measurement 0.883 0.892

p<0.001.

2D: two-dimensional, 3D: three-dimensional.

Table 3.

Inter-observer reliability

Variable Glenoid version Glenoid inclination
2D measurement 0.456 0.374
3D measurement 0.853 0.845

p<0.001.

2D: two-dimensional, 3D: three-dimensional.