2.1 Spine formation in molluscs

Molluscan shells form via an accretion process that occurs at the shell edge by a thin elastic organ called the mantle. The mantle lines the inner surface of the shell, such that during the incremental growth of a new layer of shell material, the mantle extends slightly beyond the already calcified edge of the shell, adheres to the shell edge, and secretes proteins which subsequently harden into a new layer of shell. This is shown schematically in Fig 2(b).

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Fig 2. Modeling framework schematic.

A biochemical system, modeling an Activator-Substrate reaction (a), potentially creates a spatial pattern, depending on the choice of six parameters. This biochemical pattern is passed to the tissue scale (b) and defines the rate and width of mantle growth and secretion. From this mechanical process, a spine shape emerges, which is then compared with an image of an actual spine (c). For a given shell, we then seek the biochemical parameters such that the model output best matches the real spine shape, (d).

https://doi.org/10.1371/journal.pcbi.1011835.g002

Some of the most interesting features on molluscan shells are the so-called ornamentations, three-dimensional structural patterns such as ribs, spines, and tubercles that appear as deviations from the simple logarithmic shell coiling [20]. These organism-level patterns are diverse, occasionally quite complex (e.g., fractal-like spines on certain species of Muricidea), and tend to be quite regular within a specimen. A suite of models have been formulated to understand different types or aspects of shell ornamentation in terms of the physical forces involved in the shell growth process, by considering the mechanical interaction of the shell-secreting soft mantle and the rigid shell aperture to which it attaches during shell formation [15, 26–31]. The key conceptual idea is that if the secreting mantle is longer than the shell edge, then attachment to the shell may induce deformation of the mantle, thereby influencing the shape of the subsequent layer. In other words, the shell edge determines the shape of the mantle, while the shape of the mantle determines the evolving shape of the shell edge. Previous mechanics-based models have been successful in providing a physical basis for a number of previously unexplained features on shells, including the interlocking of bivalve shells [32] and the strange meandering shape of certain ammonites [33]. However, while such models can be informative as to the basic mechanisms of pattern formation, e.g., a mismatch between mantle growth and shell secretion, they are limited by construction at the continuum tissue scale. Thus, the question remains of how the appropriate ingredients underlying the model input/assumptions are generated.

2.2 Model

We restrict our attention to the formation of a single spine, described at the tissue-level by the mechanics of growing elastic rods, an extension of a previous model [15], and with heterogeneity (pre-pattern) in growth explicitly emerging as the output of an underlying biochemical model borrowed from a previous work on shell pigmentation [17]. Using output from the biochemical model as input to the tissue mechanics model to simulate a spine is novel but nevertheless straightforward; the major challenge is in (1) doing so in such a way that the resultant shapes have features corresponding to those observed in the collected shells, and (2) searching the model parameter space for values that best match the extracted spine data.

The premise of our analysis is that spine formation results from a spatially inhomogeneous shell growth process, with inhomogeneity at the level of mantle deformation and shell secretion deriving from underlying inhomogeneity at the cellular/subcellular scales due to biochemical processes. Our methodology and modelling approach is illustrated schematically in Fig 2, and consists of four components: biochemical pattern formation, tissue-level spine formation via growth and elastic deformation, extraction of growth parameters to match spine shapes from shell specimens, and corresponding biochemical parameter determination. The broad idea is that we pose a set of biochemical equations, whose behaviour is governed by a small number of parameters, . Spatial pattern formation at the molecular level is then passed to the tissue-level, where the same form of spatial pattern is input as an inhomogeneous profile for a mechanical model of the growth and spine secretion. The output at that level is the shape of a spine across a time sequence. This output can then be compared with images of actual spines, such that for a given spine from a real shell, we seek the parameters for which the shape output is the best match. Repeating this process for a large number of spines from different populations, we can then aim to quantify any population-level differences across the scales.

Each of these methodological components is outlined further below.

2.3 Best-fit spine parameter extraction

Having formulated a procedure to map from a point in the 6-dimensional input parameter space, , at the molecular level to the evolving shape of a spine at the tissue level, we require a procedure for connecting that shape to the profile of spines from actual shells and quantifying spine form. As noted, the general goal is to find the point in the space, , that produces a best-fit shape for a given shell.

However, it is important to note that the computational solving at the tissue scale is non-trivial, in particular because at each time step the equations of rod geometry and mechanical equilibrium form a nonlinear and inhomogeneous boundary value problem. Common techniques such as branch tracing do not apply, given the presence of the shell edge term, p, which acts as a non-uniform forcing term that must be updated quasi-statically between each solving step. For a given growth profile, g, and other input parameters, solving for the time evolution of r and p, i.e,. the evolving shape of the mantle and shell edge, takes on the order of minutes to tens of minutes. Therefore, when searching the 6-dimensional space for the parameters that produce an evolving spine shape most similar to a given real spine, there is a computational bottleneck in solving the equations at the tissue scale.

2.3.1 Workflow.

Fig 2 suggests a workflow that describes how the parameters, , produce a profile, a, that maps to a growth profile, g, that is then compared with a spine image, after which is updated until an optimal shape agreement is obtained.

Our approach in searching the space is to employ a Quality-Diversity algorithm [35, 36], a type of black-box optimization algorithm designed to produce a variety of candidate solutions, to generate the space of growth profiles generated by the molecular model (see Section 2.4 for details). Quality-Diversity algorithms have been established as an efficient way to explore a high-dimensional space and build a fitness landscape across phenotypic characteristics. Note that for low dimensional problems other methods such as Latin Hypercube Sampling or Sobol sequence can efficiently deal with this exploration phase, which are also provided by our framework.

Due to the tissue-level bottleneck, we restrict the class of functions that can be input at the tissue-level. In particular, we suppose that the growth profile, g, in Eq (5) has the shape of a Gaussian: (6) where s is the arc length parameter in the current configuration, and l the total current arc length. Since we restrict our analysis in this study to individual spines, a Gaussian provides an appropriate form to capture the heterogeneity needed for realistic spine formation. We note that a similar form was used in Chirat et al. [15] mechanical for the bending stiffness, E_b, but with an inverted Gaussian; since, in our model, the bending stiffness is inversely proportional to the cube of the growth, the same effect is achieved here. Moreover, as we show in Section 3, the two degrees of freedom g₁ and g₂, describing the growth rate and width of the growing region, respectively, provide sufficient variability to produce distinct but realistic spine morphologies. In this way, only two input parameters are needed at the tissue level. Other tissue-level parameters, such as the domain width, calcification rate, and adhesion stiffness, are set in non-dimensional form by a combination of estimating physical values and producing realistic buckling modes; for more details see S1 Text Section 2. Since our approach links the steady state spatial profile of the activator, a(x, t), with the growth profile g(s), we require that the biochemical model outputs profiles reasonably close to a single Gaussian. An advantage of the system (1) is that such profiles do emerge, and the requirement for a single Gaussian was used to constrain the biochemical parameter space (for more details, see S1 Text Section 3).

Rather than simulating the tissue model at each call within the optimization algorithm, we integrate before exploration the tissue-level model for different pairwise combinations of g₁ and g₂, thus producing a finite zoology of shape evolution curves that can be compared with real shells and providing a range of reasonable values for those parameters. This approach allows us to define both the quality and diversity for the exploration process: the quality of a given growth profile is defined as how close it matches a Gaussian shape and its diversity is defined as whether the corresponding {g₁, g₂} pair of that Gaussian is different enough from solutions found so far. Note that g₁ and g₂ are continuous values and thus will likely not match exactly the values used in the initial integration. The final set of parameters kept by the algorithm (due to their quality, diversity, or both) is denoted by .

Once the exploration process is completed, we can extract from each spine image the values of g₁ and g₂ that best match the shape (details in Section 2.3.3). This provides a pair of target values of {g₁, g₂} extracted for each spine; the parameter space is then searched with the objective of producing an output that is close to a Gaussian with width and height corresponding to the target {g₁, g₂} values, allowing for an optimisation protocol that does not need to explicitly call the tissue model. This updated and simplified workflow is illustrated schematically in Fig 3.

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Fig 3. Model workflow.

(a) At the tissue level, a Gaussian growth profile is input to the mechanical model, defined by two parameters {g₁, g₂}, for which different values produce different spine shapes that are then compared to a given spine image from a real shell in order to determine a best fit target pair {g₁, g₂}. (b) At the molecular level, a Quality-Diversity algorithm looks for the full range of {g₁, g₂} pairs that can be produced by the Activator-Substrate reaction-diffusion system and stores the parameter sets that produced them in a grid. Sets in the grid may be reused by the algorithm, with some added noise (mutation), in an attempt to explore nearby area of the {g₁, g₂} space. The filled grid is then used as a look-up table that provides parameter sets matching a given {g₁, g₂} pair from the tissue level.

https://doi.org/10.1371/journal.pcbi.1011835.g003

2.4 Algorithmic exploration of the parameter space

We use MAP-Elites [40], implemented in the Python library qdpy [41], to explore the parameter space. The algorithm generates sets of parameters for the model (see Table 1), which are then used to simulate the reaction-diffusion model (1). We fixed the diffusion coefficients as we do not expect to see variability on those parameters between individuals. Those parameters were instead set to generate appropriate growth profiles, g, when performing a cursory direct exploration of the parameter space. Parameter ranges and sampling methods are given in Table 1.

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Table 1. Model parameters, parameter ranges, and sampling methods.

https://doi.org/10.1371/journal.pcbi.1011835.t001

We then fit the spatial concentration profile of the activator species, a(x, t), to a Gaussian function, giving us three values: the distance between the molecular profile and the fitted function and the parameters g₁ and g₂ from Eq 6. The set of parameters is then stored in a grid at a position defined by g₁ and g₂. If another set of parameters generated a similar Gaussian shape (i.e., near-identical values g₁ and g₂, based on the grid discretization), the algorithm only keeps the set generating the best fit. This way, we ensure that the generated parameter space only contains sets that produce concentration profiles that are close to a Gaussian profile. Once the algorithm has found enough sets, further sets may be generated through a small change in the parameters of a random existing set (mutation) or through complete random sampling (like the initial points). Both mutation and random generation sample the parameters either logarithmically or linearly, depending on their range and impact on the model. The exploration continues until the algorithm has evaluated a given number (budget) of parameter sets. Furthermore, to ensure the stability of parameter space , the algorithm is rerun multiple times, generating independent grids. Parameters used for the algorithm and simulation are given in Table 2. Each grid is then used to map pairs {g₁, g₂} to a given set of parameters for the biochemical model. Specifically, we look for the nearest non-empty cell in the grid and return the corresponding parameter set. Those sets are then analyzed to identify trends with respect to the different populations of shells.

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Table 2. Algorithm and simulation parameters.

https://doi.org/10.1371/journal.pcbi.1011835.t002

3.1 Impact of growth profile and spine shape

Before applying our analytical procedure to the shells obtained and investigating population-level differences, we first demonstrate the qualitative effects of the growth profile on the spine shape. Fig 4(a) shows a ‘morphospace’ of spine profiles for different values of g₁, g₂, where we recall that the incremental growth profile at the tissue level takes a Gaussian form (7) where s denotes the current arc length parameter, which relates to the initial and grown arc length parameters, S₀ and S, respectively, by the total stretch, λ, via λ = (∂s/∂S)(∂S/∂S₀); and l is the total current length of the rod (see S1 Text Section 2). Included in Fig 4(a), at each point in the {g₁, g₂} plane are the evolving spine profiles (green curves), as well as the corresponding growth profiles g(S₀), plotted on the same scale for comparison (and centered on the axis). The function g(S₀) describes the increase in arc length of the mantle edge as a function of initial position. A larger value of g₁ thus corresponds to a larger increase in arc length per time (for a given material section), while a larger value of g₂ corresponds to a wider growing region. Several features are evident in Fig 4(a). Increasing g₁ has the effect of producing a more curved spine, while a lower value produces a straighter and taller spine before self-contact occurs. This reflects the notion that with an increased excess of length (larger g₁), the mantle deformation per time step is more pronounced and therefore with higher curvature, while with smaller g₁, the mantle shape evolves more slowly, staying closer to the evolving shell edge. An increased g₂ produces a wider spine, since the growing region is wider, and in particular we find a much narrower spine tip for the smaller value of g₂, which is due to the combination of a narrower growing region, but also the corresponding decreased stiffness.

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Fig 4.

(a) Morphospace of spine shapes as the growth parameters g₁ and g₂ are varied. (b) Aggregated sets of biochemical model parameters, plotted with respect to their respective {g₁, g₂} values. Coloring corresponds to the value of individual parameters, showing a clear global organization for c₁, c₂, and c₃.

https://doi.org/10.1371/journal.pcbi.1011835.g004

3.2 Impact of biochemical model on growth profile

Having established ranges of {g₁, g₂} that generate realistic spine shapes, we consider next whether there are parameter regions in the biochemical model that output a concentration profile that can match the desired Gaussian shapes.

Fig 4(b) shows an aggregation of all sets found through the exploration of the biochemical model’s parameter space. Contrastingly, white space correspond to {g₁, g₂} values that could not be generated by any of the parameters. We observe that the level of parameters, c₁, c₂, and c₃, has a strong connection to the {g₁, g₂} values, forming distinct regions. That is particularly true with respect to the values of g₂. Low c₁ (low saturation of the autocatalytic production) combined with low c₂ (low direct production from substrate) and high c₃ (high degradation rate) yields low values of g₂. When c₁ is high instead (strong saturation of the autocatalytic production), we get high g₂ values. Finally, intermediate values of g₂ are achieved for high c₂ values with low values of c₁ and c₃, thus hinting at a strong activation, both from autocatalysis and production from the substrate.

The parameter, c₄, however, seems less well-defined and can seemingly take a wide range of values regardless of g₁ or g₂. This connection can be explained by considering that, in the biochemical model (1), c₁, c₂, and c₃ are connected through their common impact on the concentration of the activator species, a. However, c₄ only impacts the substrate species, s, possibly allowing more freedom compared to the other parameters.

Finally, we note that the sets tend to gather in a central area with well-defined borders, with only a few points extending beyond. The sparsity of these areas can be attributed to two possibilities: (1) the molecular model is unstable for such parameter sets or (2) such {g₁, g₂} values cannot be generated by the model at all. The ruggedness of the main cluster’s bottom edge and the presence of a few points for low values of g₁ and g₂ tend to point towards possibility (1) in that area. Adding a bias to the exploration algorithm, as well as finer parameter tuning for those area, could help flesh out the parameter space. On the other hand, the sharpness of the upper right edge seems to indicate the latter possibility; that indeed, high values of both g₁ and g₂ cannot be generated by the model. That hypothesis is consistent with a standard linear stability analysis of the system (see S1 Text Section 4).

3.3 Identifying and quantifying morphological differences

The main results of our analysis are summarised in Fig 5. Fig 5(a) shows the result of the extracted {g₁, g₂} values from spine images, with the radii of the circles scaled by the number of spines with those particular best-fit values of {g₁, g₂}. Fig 5(b) plots the corresponding values of c_i, i = 1…4 that map to the given {g₁, g₂} in relation to each other. In each case, the values are sorted by population: orange points correspond to Hayama, blue points correspond to Jyogashima, and green points correspond to Tateyama. Here we note that these plots aggregate the values from all 5 runs of the optimization algorithm. While few {g₁, g₂} pairs were observed for each population, the four c_i parameters offer enough flexibility to generate different values for each independent run. However, as noted in the previous section, a general trend could still be observed in the relation of the parameters with each other.

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Fig 5.

(a) The best-fit values of {g₁, g₂}, extracted from comparing tissue-model output to images of real shells, separated by population. (b) Relationship between biochemical model parameters for each population, as obtained from the algorithmic parameter exploration. The + symbol represents the average parameter values for the population, highlighting the difference between the Jyogashima population and the other two.

https://doi.org/10.1371/journal.pcbi.1011835.g005

In Fig 5(a) we find a population-level bias in g₁ values: spines on shells collected in Hayama and Tateyama are better modeled by smaller values of g₁, while spines from shells collected in Jyogashima are better modeled by larger values of g₁, though these shells also show a wider distribution. Using two-sided Wilcoxon rank-sum tests, the distribution of g₁ values are, on average, an estimated value of 0.25 higher compared to Hayama, with a p-value of 1.202 × 10⁻⁵ (and 0.4 higher compared to Tateyama, with a p-value of 5.7 × 10⁻⁶). The g₁ values for Hayama and Tateyama do not show a significant statistical difference, and similar analysis of the distributions of g₂ values show only very small statistical difference between the populations (see S1 Text Section 6 for details).

This implies that the only statistically significant difference is found between the distributions of g₁ values, with the distribution of Jyogashima values being larger than the other two populations. Recall from Fig 4 that g₁, which controls the rate of growth/secretion, primarily impacts the height and curvature of the spine profile, with larger values of g₁ producing a more curved spine that reaches the point of self-contact at a lower height. Note that this does not imply that spines with larger g₁ are shorter, as our computational model stops at the point of self-contact, while spine formation may continue well past self-contact—that is, in some cases, the two sides of the spine come into contact, beyond which a sort of ‘zippering up’ occurs while the spine continues to grow in height (see also S1 Text Section 5). This analysis thus suggests that a difference in spine form does exist between the shells we have collected from Jyogashima and the shells collected from the other two populations. While shells from the populations generally appear quite similar, upon closer inspection, it can be observed that the spines of shells we have collected from Jyogashima tend to be more curved, while the shells from Hayama and Tateyama tend to have straighter spines. The distinction, though subtle, can be observed in the spines of the sample shells shown in Fig 1 (see also S1 Text Section 5, which shows images of all spines for which we have extracted data, as well as the best-fit curves overlaid).

The population-level differences in g₁ between the Hayama/Tateyama populations and the Jyogashima population is reflected in the biochemical parameters {c₁, c₂, c₃, c₄}. This is most evident in examining the average parameter values for the populations, indicated by the + sign in the plots of Fig 5(b). We see that in all parameter pairings, the averages for Hayama and Tateyama are closer together and separated from the average of Jyogashima. The difference is greatest in the parameters c₂ and c₃: the Jyogashima population shows a higher value of c₂ and lower value of c₃. This is consistent with the biochemical interpretation of these parameters. The parameter c₂ describes direct production rate of the activator from substrate, while c₃ describes activator degradation. Hence high c₂ and low c₃ combine to make an increased concentration of activator, i.e. high g₁, and the high growth rate produces a more curved spine shape. No such trend could be observed in the values of c₄, with all populations having a similar average. Stability analysis showed that, as long as c₄ is low enough, its impact is minimal on the production of a Gaussian curve. When c₄ is low enough, the concentration of substrate remains high enough to help produce the activator, which is required to form a pattern.