Design and implementation

The Origami pipeline is preceded by a membrane-based segmentation step. For this, we employed the open-source ACME segmentation software [14]. The segmented data are subjected to two main operations within Origami; epithelial polarity direction vector assignment (Fig 1B) and extraction of shape features (Fig 1C).

Assigning polarity direction to individual cells

To compute directionally variant cell shape features, such as skewness (asymmetry in cell mass), and longitudinal and transversal spread, the positioning of segmented cells must be found in 3D space along a biologically relevant axis—we chose the known apico-basal axis of the cell. The folding epithelium was reconstructed in silico as a thin ‘crust’—an open surface mesh that triangulates the centroids of the segmented cells in 3D space using the Crust algorithm [36,37] (Fig 1B). The Crust method computes a surface mesh from unorganised points—cell centroids in our case, using the Voronoi diagram of the cell centroids.

Following this, our automated method corrects imperfections in the estimated surface mesh that can cause errors in the resulting direction vectors. The mesh is refined by removing duplications (in vertices or triangular faces computed) and any self-intersecting triangular faces. Non-manifold edges, that is, those edges shared by more than two triangular faces, are re-meshed as a manifold mesh using the ball-pivoting algorithm [38,39].

The triangular faces of the refined mesh are ordered, and so by applying the right-hand rule when generating normal vectors to the surface mesh, these vectors all point to the same side of the mesh representation of the epithelial surface (Fig 1B). At this point, there are still two possible opposing orientations for each computed vector—facing the apical or the basal face of the epithelium, with a difference only in sign. In the developing zebrafish otic vesicle, the apical surface of the epithelium faces the fluid-filled lumen of the vesicle [2,8,40]. We used this prior knowledge to inform the orientation of the vectors by setting the value of a binary orientation-determining parameter to ‘in’ so that they point to a convergent point which falls on the side of the curved surface mesh that corresponds to the apical (lumenal) side of the epithelium at each cell. When a structure folds multiple times in opposing orientations, such as in the synthetic data generated for this study, ‘in’ sets the polarity direction vectors to point towards a global convergent point, in our case determined by the curvature of the whole synthetic epithelium.

Under-segmentation can cause missing regions or unwanted holes in the triangular mesh, introducing errors when ordering the triangular faces. Our pipeline attempts to repair these holes by detecting and then remeshing them where possible. Holes, when detected, are flagged as a warning to users about potential errors in the output. Normal vectors to the reconstructed surface represent the apico-basal axis of the epithelium and are generated for each segmented cell at their centroid position (Fig 1B and 1C).

Computing shape features using 3D geometric moments

The shape of an object can be characterised using central geometric moments [41]. Geometric moments are widely used in object recognition and classification problems [42,43] since they (i) are simple to compute, (ii) organise features in orders of increasing detail, and (iii) can be extended to n dimensions. Each moment, , is defined by the integral over the object (in our case, each segmented cell), of the Cartesian coordinates monomial , where i, j, k ≥ 0, with the origin of coordinates at the centroid.

In our analysis pipeline, 3D geometric moments were computed using the algorithm introduced in [35]. The defining continuous integrals are exactly computed within the triangular surface mesh generated for each individual segmented cell, split into a sum: (1) where each tetrahedron T_c is defined by a triangle in the surface mesh and the origin (cell centroid). The determinant gives the oriented volume of this tetrahedron, (2)

Considering its sign, the determinant allows the algorithm to be applied to shapes of any complexity and topology. The integral in each T_c is given by a closed formula involving only the Cartesian coordinates of the triangular vertices.

The geometric moments of low orders have simple, intuitive interpretations. The zero^th order moment provides the volume of the object, here an individual cell. For central moments, the first order moments are trivially null: . The second-order moments correspond to the spread (covariance tensor) of the distribution. So, the projection of the mass of each cell along the corresponding polarity vector represents the ‘spread’ as variance in mass ‘longitudinally’ (along the apico-basal axis) and ‘transversally’ (along the epithelial plane). This allowed us to identify if cells were more or less columnar (tall cells) or squamous (flat cells) in shape. The third-order moments represent ‘skewness’, which is the deviation from symmetry. In our pipeline, skewness was measured along the polarity direction vector in the apico-basal direction, with positive skewness values indicating apical cell constriction and/or basal relaxation and negative values indicating basal cell constriction and/or apical expansion. A value of zero indicated no skew. Additionally, the sphericity of each cell was computed as the ratio of the cell surface area to the surface area of a sphere with the same volume as the cell [44], from 0 for a highly irregularly-shaped cell to 1 for a perfect sphere.

Evaluation of computed cell polarity direction vector

To evaluate the computed direction vectors denoting cell polarity, we generated 3D synthetic data representing curved, folding epithelia with varying degrees of curvature and height of folded peak in two opposing orientations (S1 Text and Fig 2A). To reflect real-world in vivo fluorescence imaging conditions, these synthetic data were corrupted with three incremental levels of Gaussian and Poisson noise (S1 Text and Fig 2A). Using the synthetic data, two types of error in computed polarity direction vectors were assessed: (1) an orientation flipping error, measured as the percentage of polarity vectors with an opposing orientation (opposite sign) to the polarity ground truth (S1 Text), and (2) direction accuracy, measured as the mean deviation angle between the polarity vectors produced by Origami, correctly oriented, and the polarity ground truth.

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Fig 2. Assessment of polarity assignment.

a. Surface meshes of synthetic epithelia for validating the Origami analysis pipeline. Alongside, 3D rendering of one of the synthetic epithelia (top) and a single 2D slice through it (bottom). Each image volume was corrupted with three levels of noise. b. The relationship between surface geometry/noise and segmentation quality. Error bars represent the standard deviation. Tukey’s pairwise comparisons with significant values depicted with asterisks: Dice score at radius of curvature of 200 μm (1000 pixels) compared to that at 106 μm (530 pixels)–p = 0.0004, Dice score at largest noise level compared to the lowest: p = 0.0045. c. Effect of segmentation quality on errors in orientation flipping (left) and direction offset in the computed polarity vectors (error bars in grey represent standard deviation). Dashed lines represent quadratic and linear fit to data respectively. d. Probability density of errors in polarity direction in real fluorescence data from zebrafish embryos. Each dot represents the percentage error from a 3D segmented volume (n = 27; total of 949 segmented cells across all the images). The dashed line shows the mean error in the dataset (<4%). e. Sensitivity of cell shape metrics to errors in polarity orientation. Data points in the graphs are depicted with the same colour as the corresponding synthetic cell alongside. Tukey’s pairwise comparisons with significant values depicted with asterisks; Longitudinal spread: 1–2 p = 0.039, 1–3 p < 0.0001, 2–3 p < 0.0001; Transversal Spread: 1–2 p < 0.0001, 1–3 p < 0.0001, 2–3 p < 0.0001; Skewness: 1–2 p < 0.0001, 1–3 p < 0.0001, 2–3 p < 0.0001.

https://doi.org/10.1371/journal.pcbi.1009063.g002

Of the two aspects of surface geometry analysed, height of folded peak (in two opposing directions) did not contribute significantly to orientation flipping errors (Linear Regression; p = 0.86, R² = -0.04). However, a larger radius of curvature of epithelium (a flatter epithelial sheet) did correlate with orientation flipping errors—albeit with a small effect of 0.08% increase for every 1 μm (5 pixels) increase in radius of curvature (Linear Regression; p = 0.042, R² = 0.12, effect), and a lower quality of segmentation output from ACME (Linear Regression p < 0.001, R² = 0.46; Fig 2B) computed as a Dice score. This meant a 0.2% reduction in Dice score for every 1 μm (5 pixels) increase in the radius of curvature. This correlation may be attributed to the reduced ability of ACME to segment flat, squamous cells in an epithelium oriented mostly along the lateral (xy) plane in data with anisotropic voxel resolution (here modelled using an anisotropic point spread function (PSF)). We found a correlation between noise applied to the synthetic images and errors in both polarity orientation flipping (ANOVA: p ≈ 0.001; Tukey’s contrasts showed 11.3% increase in errors at highest noise level compared with the lowest noise level applied: p = 0.0039) and segmentation output (ANOVA: p < 0.01; Tukey’s contrasts showed 16.3% reduction in Dice score at highest noise level from the lowest noise level applied: p = 0.0045). Segmentation quality, in turn, influenced polarity orientation flipping, with errors below 1.5% at Dice scores above 0.8, but increasing with further decrease in Dice scores (Polynomial Regression; first-order: p < 0.001, Effect size = -28.78; second-order: p < 0.01, Effect size = 16.26; Fig 2C). Comparisons of many available segmentation algorithms when validating with fluorescent images from non-folded structures such as early-stage nematode embryos [16] or plant roots [18] have been shown to give Dice scores above 80%, suggesting a good performance under real experimental conditions.

Quantitative direction accuracy was evaluated in the synthetic data, for which, in contrast to data from real fluorescence images, a reliable ground truth could be generated from the known underlying surface functions. Compared to the polarity ground truth data, an overall offset of 10.6° ± 15.5° (mean ± std) was measured from our entire synthetic dataset. Just as for the polarity orientation flipping error, height of folded peak did not influence polarity direction accuracy (Linear Regression; p = 0.39, R² = -0.01), but there was a small effect of curvature of the epithelium with an additional 0.06° offset for every 1 μm (5 pixels) increase in radius of curvature of the epithelium (Linear Regression; p = 0.005, R² = 0.24). At the highest level of noise applied, errors in polarity orientation had a 6.6° greater offset than at the lowest noise level applied (Tukey’s contrasts; p = 0.003). There was also a negative linear effect of segmentation quality with a 2.9° offset predicted for every 10% reduction in Dice score (Linear Regression; p < 0.0001, R² = 0.53; Fig 2C).

We further tested the effect of such errors in direction accuracy on the direction-variant shape metrics computed by applying directional noise—with a mean equal to the measured mean error above—to polarity vectors of three example cells showing extreme shape features from the synthetic dataset and computed direction-variant shape metrics for each new displaced polarity vector (n = 50; Fig 2E). The resulting computed shape metrics could still successfully differentiate between the three cells, showing that direction accuracy errors (excluding orientation flipping errors) should not adversely affect the shape metrics computed. On the other hand, orientation flipping errors will affect shape metrics, but as shown above, these errors are predicted to be small for a well-segmented image volume and can be easily identified by visual inspection and corrected if needed using the Origami pipeline.

Additionally, orientation flipping errors were quantified from real light-sheet fluorescence microscopy data from structures in the developing zebrafish otic vesicle (Figs 1 and 3). For this, cells assigned the wrong orientation along the apico-basal axis—that is, facing the basal surface instead of the apical surface, were identified by visual assessment in the Origami pipeline, showing errors in 3.65% of n = 949 cells analysed (Fig 2D).

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Fig 3. Comparison of shape dynamics in developing structures of the zebrafish inner ear.

Rows represent each time point analysed. Data in blue represent cells from AP, green represent cells from PP and magenta represent ES. a. Linear discriminate analysis (LDA) biplots illustrate multivariate clustering of data—data from AP and PP show considerable overlap indicating similar shape signatures while data from ES show less overlap with the former. b. Schematic illustrations of cell shape signatures at the time points analysed showing cells in the ES having skew in the opposite direction to those in the projections and having less rounded shapes. Arrows indicate apico-basal polarity. c. Plots showing differences in skewness and sphericity between the structures at the time points analysed. Yellow dots with error lines represent mean and standard deviation for the data. p values for paired comparisons depicted are from Table 1.

https://doi.org/10.1371/journal.pcbi.1009063.g003

Proof of principle: Insights into cell shape dynamics during epithelial morphogenesis within the zebrafish inner ear

To further validate our method, we used Origami to characterise cell shape dynamics involved in the formation of different structures in the otic vesicle of the zebrafish embryo (Figs 1 and 3). We analysed light-sheet fluorescence image data from the anterior epithelial projection (AP) for the developing semicircular canal system, together with the endolymphatic sac (ES), at three developmental time points: 42.5 hours post fertilisation (hpf) (time point 1), 44.5 hpf (time point 2) and 50.5 hpf (time point 3), using three different fish for each time point. We also analysed the posterior epithelial projection (PP), a similar structure to the AP, but which develops later [40], at developmentally equivalent time points to that of the AP (46.5 hpf, 50.5 hpf and 60.5 hpf). The AP and PP are finger-like projections of the epithelium that move into the lumen of the vesicle, with the apical side of the cell on the outside of the curved projection surface [40]. By contrast, the ES forms as an invagination from dorsal otic epithelium, with the constricted apical surfaces of the cells lining the narrow lumen of the resultant short duct [8,45,46]. As the ES is formed through deformation of the epithelial sheet with opposite polarity to that of the epithelial projections, we expect cells in the ES and the projections to show significant differences in cell shape. Conversely, we do not expect significant differences in cell shape between the AP and PP cells, which form equivalent structures in the developing ear.

For each structure, the following shape attributes were computed at the single-cell level: surface area, sphericity, longitudinal spread, transversal spread and skewness. Since volume and surface area show high collinearity within our data (Pearson correlation coefficient = 0.98, 95% confidence intervals = [0.977, 0.984]), cell volume was excluded from further analysis. Although images included cells in the non-folding epithelium around the developing structures of interest, only cells from the folding epithelium were analysed. A multivariate analysis ({MANOVA.RM} package [47] in R [v 4.0.0]) of the dependence of cell shape attributes on the epithelial structure from which they are derived at different time points showed a significant difference between the three structures at the first two developmental times (Wald-type statistic; p = 0.035 (resampled p = 0.001) at time point 1 and p < 0.001 (resampled p < 0.001) at time point 2) but not at the final time point analysed (p = 0.706 (resampled p = 0.038)) for all shape attributes. Post-hoc Tukey’s contrasts indicated that cells in the endolymphatic sac showed significantly different shape dynamics from those of cells in both projections (ES—AP p = 0.006, PP—ES p = 0.012 at time point 1; ES—AP p = 0.0002, PP—ES p = 0.0002 at time point 2 but ES—AP p = 0.192, PP—ES p = 0.116 at time point 3). There was no significant difference in the cell shape signature between cells in the anterior and posterior projections (Tukey’s contrasts; PP—AP p = 0.997 at time point 1; PP—AP p = 0.999 at time point 2 and PP—AP p = 0.896 at time point 3). These results indicate that the cell shape features included were more similar than different for cells from the structures at the third time point analysed.

Of the attributes analysed, skewness (Kruskal-Wallis test; p = 0.008 at time 1, p = 0.004 at time 2 and p < 0.0001 at time 3), sphericity (Kruskal-Wallis test; p < 0.001 at time 1, p = 0.00012 at time 2 and p < 0.001 at time 3) and surface area (Kruskal-Wallis test; p < 0.001 at time 1, p < 0.0001 at time 2 and p = 0.018 at time 3) described significant differences in cell shape across all the three time points analysed; cells in the endolymphatic sac were characterised by positive skewness values, smaller sphericity values and larger surface areas as compared with cells in both projections, which show negative values of skewness (Table 1 and Fig 3).

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Table 1. Paired comparisons using Wilcoxon rank sum exact test (p values–adjusted using ‘Holm’ correction).

https://doi.org/10.1371/journal.pcbi.1009063.t001

The differences in surface area are likely to be attributed to differences in sphericity between the cells in the three structures, but not in dimensions, as the transversal and longitudinal spread showed no significant differences.

Availability and future directions

Origami is free to download from: https://github.com/cistib/origami. It is implemented within MATLAB (compatibility with version 2018b onwards) and includes additional tools for visualising cell shape metrics from complex folding epithelia at the single-cell level. Instructions for installation and use are included with the software.

Our software can accept pre-segmented data, making it compatible with segmentation algorithms of the user’s choice, potentially allowing for data acquired using other 3D imaging techniques such as tomography to be analysed. Segmented data must represent cell shape accurately, and so the choice of imaging technique that can faithfully detect 3D cell shape alongside membrane or cytoplasm-based segmentation is critical.

We used a priori knowledge of the otic epithelium organisation to inform the orientation of the apico-basal axis of the epithelial sheet to face the lumen of the otic vesicle [2,8,40]. It is essential to know the organisation of the apico-basal axis of cells within any new structure studied to apply Origami—wherein, the orientation-determining parameter can then be set to always be ‘in’ or ‘out’ depending on if the polarity direction vector is required to point towards the inside or outside face of a curved structure. We also assumed that individual cells do not violate this organisation, as this cannot be detected without additional polarity-specific labels. In such a case, polarity vectors from our analysis can be complemented with information from polarity-specific labelling to track such behaviour. Moreover, to compute shape features along an alternative axis of polarity, the pipeline can accept pre-assigned polarity as a cell-specific vector-list.

We expect Origami to be applied to studying a wide range of morphogenetic processes and to contribute to our understanding of the biomechanical processes underpinning them.