One-Dimensional Model Analysis

Before analyzing the effects of embryonic geometry and DV-asymmetric positional information, we reimplemented the 1D model of Jaeger et al. using the finite element method. In this work we denote model variants with M; superscripts represent model domains and subscripts signify initial conditions if multiple initial conditions are used. The 1D model of Jaeger et al. is called (using a 1D domain representing a partial AP length of 35%–92%; full model nomenclature available in Table 1). We verified against Jaeger et al. 's simulated output. Whereas the original model limited gene expression to a finite number of discrete nuclear coordinates along the 35–92% region of the embryonic AP axis, the FEM approximates a continuous solution to these equations along this domain. Discrete versus continuous model comparisons by Gursky et al. suggest that embryonic patterning is not strongly coupled to nuclear position and that continuous models are comparable to discrete models of gene expression [51]. Our results agree with this finding. FEM simulations produce model output comparable to Jaeger et al. 's discrete 1D model (Fig. 2a, dashed line, cf. Figure S20 in [13]).

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Figure 2. One-dimensional model results.

Model output was simulated over a 0–100% AP length domain using the optimal GRN reported by Jaeger et al. Solid vertical lines represent the original model boundaries, not used in this simulation. (A) (solid lines) shows qualitative agreement with the Jaeger model (dashed lines) in the 35–92% AP range, but shows discrepancies at either end of the domain due to the movement of boundaries; all species displayed at t = 70 min. (B) The best-fit GRN from Jaeger et al. was locally optimized to improve the agreement of the 0–100% AP length, model (solid lines), and the original Jaeger et al. original model ( dashed lines); all species displayed at t = 70 min. (C) VE protein data for Gt, Hb, Kni, Kr at t = 70 min; VE mRNA data for Tll at t = 70 min; protein data from Jaeger et al. for Cad at t = 56 min. (D) Model output () was also optimized against VE data (RMSE = 13.992); Gt, Hb, Kni, Kr, Tll at t = 70 min; Cad at t = 56 min. Despite modest improvements in model agreement in the 35% and 92% region (C–D), the resulting changes in parameter values were small. (E) Optimized parameter magnitudes vary but signs remained the same in most cases (blue - ; green - ; red - ).

https://doi.org/10.1371/journal.pone.0026797.g002

Though recapitulated previous results when simulated in the region from 35–92% on the AP axis, we sought to determine whether moving the boundaries to the embryo ends perturbed gap gene patterning in the trunk region. It is unclear a priori how modification of boundary conditions might impact the model output, because the selection of boundaries at 35% and 92% in earlier work appears to coincide with either maxima or minima of gap gene distributions; at these positions, spatial derivatives are near zero and diffusive flux may be negligible. Using no-flux boundaries at 0% and 100% EL, coupled with the parameters and initial conditions specified in the original model [13], we evaluated and using the GRN parameters reported by Jaeger et al. [13]. Herein, parameter sets are denoted P and super- and subscripts have model-specific meanings. The simulated patterns from the original 35–92% AP and the 0–100% AP domains are shown in Figure 2a's dashed and solid lines, respectively.

Pronounced shifts in Tll and Kr distributions, coupled with the qualitative change in the anterior Gt distribution, demonstrate the role boundary conditions play in the in the distribution of gap gen products for a given set of parameters. Though the output of qualitatively resembles the expression data collected previously when evaluated at [13], these findings suggest that 's agreement with data arises from a combination of the inferred GRN and the domain's boundary conditions. Thus, the internal zero-flux boundary conditions used in previous models may bias GRN inference. To evaluate the impact of boundary placement on GRN inference, we performed a numerical gradient descent search of the parameter space to minimize the root mean squared error (RMSE) between and (represented by the dashed line in Figure 2a). The search was initialized with the previously reported optimal . The result of this search, optimized GRN (superscript denotes the model being optimized and subscript denotes data with which the model is optimized), is illustrated in Figure 2b. Here, the output of represents extant models' with internal no-flux boundaries.

Though domain boundary placement affects the banding pattern, Figure 2b suggests that these constraints have a limited effect on GRN inference. Optimizing the GRN parameters of to fit the original model output recovered a quantitatively similar patterning within the 35–92% AP length of the full 1D domain. Additionally, the optimized GRN was qualitatively similar to (e.g., though optimized parameters underwent small changes in magnitude, all parameters maintained the same sign, Fig. 2e).

To facilitate a direct comparison between 1D and 3D models presented herein, we first evaluated the goodness-of-fit between the 35–92% AP () and full AP domain () 1D models using VE data. When possible, we use protein expression data from the VE: Gt, Hb, Kni, and Kr protein data is available across six equidistant time points spanning 50 minutes. Tll protein data is unavailable and we use Tll mRNA data as a surrogate for the protein distributions. Cad protein distributions are also unavailable in the VE; we substitute 1D Cad data from Jaeger et al. [13] that spans 45 minutes with seven time points. Because the 1D model domains represent the lateral region of the full embryo, we extracted expression data from this region of the VE (Fig. 2c). We performed a constrained search of GRN parameters initialized at to yield an optimized GRN (subscript VE denotes VE training data). The resulting model output and a comparison of model parameters are shown in Figures 2d–e.

Though was capable of recovering the output of (with parameter set ) and VE data () within the 35–92% AP axis, poor fit to VE data persisted outside of this region. The 0–35% and 92–100% AP regions exhibit qualitative disagreement with VE data in these regions consistent with the biological requirement for additional head and tail patterning genes (Fig. 2c–d).

Three-Dimensional Model Analysis

Beginning with the GRN optimized on the full 1D domain, we extended the model to a 3D domain using the geometry in the VE. This was performed by implementing the system of PDEs on a 2D surface “wrapped” around the VE geometry. We used this model to evaluate the effects of both model geometry and DV-asymmetric initial conditions on model output.

To assess the effects of model geometry on patterning independent of initial conditions, the model was first simulated using DV-symmetric initial conditions (): Bcd, Hb, and Cad distributions at time zero were obtained from the original 1D model and projected around the surface of the embryo (Fig. 3a–d). Evaluated at the previously inferred optimal 1D GRN (), model yielded patterning qualitatively similar to the full length 1D model output (Fig. 4a–g, column 2). To confirm our derivation of the diffusion constants (see Methods) and rule out unintentional adjustment of the diffusive length constant (), we performed a continuation of diffusion constants while holding decay parameters (λ_a) values constant (Figs. S2, S3). While band overlap does vary with diffusion constants, they are quantitatively similar. Interestingly, symmetric Bcd models appear robust against increased diffusion (Fig. S2) while increased diffusion disrupted patterning in asymmetric Bcd models (Fig. S3). The pattern formation timecourse for Bcd-symmetric patterning is animated in Movies S1, S2, S3, S4, S5, S6.

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Figure 3. 1D and 3D initial conditions.

Initial conditions in various models. (A) 1D model initial conditions, reported by Jaeger et al., and used in models and . (B) 1D initial conditions were mapped onto the 3D embryonic geometry (). (C), 1D initial Cad protein distribution, (D) 1D initial Hb protein distribution. Subsequent models incorporated (E) DV-asymmetric interpolated [Bcd] distribution () or (F) smoothed DV-asymmetric interpolated [Bcd] distribution ().

https://doi.org/10.1371/journal.pone.0026797.g003

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Figure 4. Three-dimensional model results.

Simulation results in the 3D model. (A–H) Lateral view of VE geometry is shown in rows A–G (Gt, Hb, Kni, Kr, Tll at t = 70 min, Cad at t = 56 min); row H displays RMSE difference between model and VE data summed with all time points. Column 1 shows scaled VE data. Column 2 displays output from evaluated with GRN . Column 3 contains output from incorporating DV-asymmetric Bcd data and GRN ; Column 4 illustrates the effect of the smoothed Bcd interpolant in while considering the same GRN . Column 5 displays output from with reoptimized parameters . White boxes indicate the lateral areas where Jaeger et al. optimized their 1D model. Animations of pattern development are available for column 2 ( , Movies S1, S2, S3, S4, S5, S6) and column 5 (, Movies S7, S8, S9, S10, S11, S12) in the supplementary material.

https://doi.org/10.1371/journal.pone.0026797.g004

Though there are some DV-asymmetries present in the output (e.g., slight curvature of the anterior Gt stripe), 1D versus 3D domain geometry alone has only a modest impact on DV patterning of gap genes. This suggests that the pronounced DV-asymmetries present in the final distributions of the proteins at the onset of nuclear division 14 (Fig. 4, column 1) stem from other sources. We consider the effect of spatial information encoded in initial DV asymmetries of protein distributions. The coupling of gap gene regulation with DV-patterning systems [5], [52], [53] is another possibility.

Effect of Dorsal-Ventral Asymmetric Bcd

To evaluate the impact of DV-asymmetric inputs on the model, we modified the steady-state Bcd distribution shown in Figure 3b to incorporate a realistic DV gradient (Fig. 3e). Unlike other morphogens, the Bcd distribution is static over the entire time course of model simulation. This allowed us to create a single interpolant of VE Bcd data and use it as a model input for all 70 minutes of the simulation. The pattern formation timecourse for Bcd-asymmetric patterning is animated in Movies S7, S8, S9, S10, S11, S12.

Evaluated at the optimal 1D GRN , model produces patterning that is radically different from DV-symmetric 1D () and 3D () models (Figs. 4a–g, column 3). The most striking example of this is the Kr model output; whereas Kr forms a full band in vivo, lacks full lateral expression of Kr and has an anomalous region of expression at the anterior end of the embryo (Fig. 4f, column 3). Similarly, the simulated Hb concentrations remain above observed levels (Fig. 4d, column 3). The posterior Hb band also shifts to the posterior end of the embryo. Gt exhibits qualitative disagreement with the VE data; whereas anterior Gt expression is observed only in a limited dorsal region of the embryo (Fig. 4c, column 1), the anterior of the is saturated with Gt (Fig. 4c, column 3). Further, though the experimentally observed posterior Gt band (Fig. 4c, column 1) is predicted by simulation, it exhibits unusual differences in width along the DV axis. As in previous versions of the model, the best agreement between model and data was found in the lateral 35–92% AP region (Fig. 4b–g, column 3 white boxes).

The cell-to-cell variability in patterning found for many simulated proteins (e.g., Gt, Cad, and Kni) in led us to consider the effect of noise in the VE Bcd distribution. Diffusion of Bcd may serve to smooth this variation in vivo; our use of a single static Bcd interpolant in leads to an artificial persistence of the noise found in VE data (Fig. 3e). To test for and remove this artificial condition, we created a regularized version of the Bcd interpolant (Fig. 3f). This was constructed by building a simple source diffusion decay (SDD) reaction-diffusion model of Bcd alone [18]. This SDD model was fit to VE data and the steady-state solution was used as the smoothed Bcd interpolant. The model incorporating regularized Bcd, , did not show significant improvement over when evaluated with (Fig. 4 a–g, column 4). However, it did eliminate the cell-to-cell variability present in . The model's artificial sensitivity to Bcd noise was especially evident in Gt (Fig. 4c, columns 3–4). Two anterior and one posterior Gt bands in changed width and AP position after smoothing of Bcd. This result suggests that while diffusion may serve as a buffer against transient stochastic variations in protein expression and local concentration (in agreement with stochastic simulation [54]), sustained cell-to-cell variability has the potential to disrupt patterning.

Having observed that a GRN inferred on the 1D domain (and lacking DV asymmetries) produces a qualitatively incorrect fit compared to 3D data, we attempted to optimize the GRN with Matlab's constrained search function fmincon() initialized at (previously used to estimate and ). This approach failed to reduce model error. Fomekong-Nanfack et al. demonstrated that 1D gap gene systems are amenable to optimization by evolutionary algorithms [45]. We therefore employed a genetic algorithm (GA) to more broadly survey the parameter space. Do to computational cost, we used a small population size of 20 genomes to search the GRN parameter space (42 parameters), the GA identified an optimal GRN for . The resulting GRN, , led to a reduction in model error and a modest qualitative improvement with respect to 3D data (Fig. 4, column 5). The lateral Kr band missing from the 1D-inferred GRN (Fig. 4f, columns 3–4) is restored (Fig. 4f, column 5), though it is not as wide as the experimentally observed band. Tll no longer shows relative over-expression at the posterior end of the embryo (Fig. 4g, column 5). Hb continues to exhibit relative over-expression at the anterior end of the embryo, though its posterior band is shifted closer to its correct position (Fig. 4d, column 5). Similarly, the anterior distribution of Gt extends beyond the dorsal region observed in the VE (Fig. 4c, column 1). However, its posterior band is now located correctly in Figure 4c, column 5 (though it is wider than the observed protein band). Beyond differences in concentration of individual proteins, DV-asymmetric Bcd causes a notable qualitative difference in the AP position and emergence of protein bands. Compared to the (Fig. 4, column 2), the DV-asymmetric GRNs (Fig. 4, columns 4–5) exhibit DV-asymmetries in their output. For example, the dorsal terminus of the anterior Gt band is posterior to its ventral terminus; it is splayed toward the anterior. This behavior agrees with observed data in the anterior half of the embryo, but the expected DV curvature is either absent (posterior Hb Fig. 4d, column 5) or inverted in the posterior half of the embryo. For example, Kni, whose dorsal terminus should exhibit posterior-splaying (Fig. 4e, column 5), is inverted. This DV curvature corresponds in direction to the DV asymmetry of Bcd. The absence of reversed splaying in the output in the posterior portion of the model (though present in the data) suggests that the model may be lacking additional posterior determinant(s) affecting the gap gene system.

In the 3D regime, demonstrated considerable sensitivity to small changes in GRN parameter values. The model was simulated after adding normally distributed noise scaled by each parameter value, p_i, across a range of magnitudes (sample model output in Fig. 5). The model gives output qualitatively similar to the optimal GRN only when parameter noise is low (e.g., 0.1% p_i in Fig. 5, column 1). All other simulations, with noise terms of 1%p_i and higher, yielded drastically and qualitatively different outputs.

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Figure 5. Model is not robust to noise in GRN parameters.

Parametric noise alters model output. Lateral view of VE geometry for all genes is shown in rows A–G (all outputs at t = 70 min). Each column displays output at t = 70 min evaluated with GRN . Columns 2–5 represent randomly chosen sample output when a normally distributed noise vector ε is added to the GRN parameter set (denoted θ). ε has mean of 0 and variance that scales with θ.

https://doi.org/10.1371/journal.pone.0026797.g005

>In summary, the GRNs we inferred in this study are qualitatively similar: magnitudes of parameters vary by approximately 10% and parameter sign stays the same in all but a few low-magnitude parameters (see Table S1). A notable exception is the regulatory parameter for the Kni→Tll interaction; here the sign of the parameter (and thus the regulatory relationship) is reversed. However, we acknowledge that the treatment of Tll as a state variable under gap gene regulation is artificial and this biological relevance of this observation is questionable. Optimization leaves most regulatory parameters with the same sign and changes only the magnitudes, and those regulatory weights which change sign have small magnitudes (i.e., small regulatory effects). The use of a global search method (GA) to optimize did not recover a superior GRN that differed qualitatively from the original P⁰.

Model Construction

Building on the successful 1D/3D embryonic modeling approach of Umulis et al., [4], [68], we reimplemented the Jaeger et al. model of gap gene regulation () using the finite element method (FEM). This model represents six gene products as state variables: Cad, Gt, Hb, Kr, Kni, and Tll [13]. A seventh protein, Bcd (Bcd), is maintained at a constant concentration during gap gene patterning and is represented as a spatially heterogeneous stationary input [13], [63]. Each of the state variables is represented by a PDE,(1)where c_a is the concentration of protein a, the first term on the right hand side represents diffusion, the second term represents gene expression, and the third term represents first order decay [13]. D_a is the diffusion constant of protein a and λ_a is the first order decay constant of protein a. R_a is the maximal rate of gene expression of proteins a and Φ_a is a sigmoid function,(2)which ranges from zero to one and accepts a regulatory argument u_a:(3)Here, h_a is a minimal regulatory threshold for expression, w_b,a is an element in the regulatory matrix W representing the influence of protein b on the expression of protein a (ranging from −0.2 to 0.2), and c_b is the local concentration of protein b. There are six PDEs representing protein proteins a = Cad, Gt, Hb, Kr, Kni, Tll (eqn. 1). In each PDE, the regulatory effects of all seven proteins, b = [41 Kr, Kni, Tll, Bcd], control protein expression (eqns. 2–3). PDEs are numerically solved using the FEM implemented in the software package COMSOL Multiphysics 3.5a [69]. Except for GRN parameters w_b,a, these parameters are fixed at values in Jaeger et al. [13] and may be found in Table S2.

Note that previous 1D models were simulated by the spatially-discretized ordinary differential equations using the finite difference method: concentrations were tracked at uniformly-distributed nodes (nuclei) along the AP axis and diffusive fluxes across the Δx inter-node distance were modeled as a first-order differential equations. As such, previously reported diffusion parameters (Ď_a) were in units of inverse time [1/t]. To convert these parameters to diffusion constants (D_a) with units of squared-length-per-time [L²/t], we multiplied Ď_a by (Δx)². To compute Δx, we took into account the length of the original model's domain (0.57 EL) and the number of nodes where the finite difference model was solved (58 nuclei). From these values, we approximated Δx as 0.57EL/57. The model spans 0.35–0.92 or 0.57 EL and is divided into 57 intervals between 58 nodes. In the case of the 3D geometry, we further accounted for the curvature of the embryo in our approximation of Δx. Scaling the embryo length to unity (1 EL), we observed an arc length of 1.14 along the lateral AP. Upon the assumption that curvature was uniformly-distributed along the AP axis, Δx was computed as (0.57/1.14)EL/57. The approach slightly overestimates D_a in the 3D model relative to 1D because most curvature occurs at the AP extrema and not the trunk, but this does not translate to a large impact on AP patterning versus 1D. Whereas finite difference models explicitly modify Ď_a values to account for mitotic nuclear division and the halving of Δx, the continuous FEM representation renders diffusion constants independent of nuclear density. It should be noted that this representation does not account for reduced effective diffusivity due to increased nuclear trapping. While nuclear density has been linked with decreased effective diffusivity in some simulations of Bcd diffusion [70], Grimm and Wieschaus found that transcription factor distributions are largely independent of nuclear density [71]. 3D nuclear density distributions have been published [47] and nuclear density-dependent diffusion is an area for further investigation.

We developed two FEM meshes on which to simulate spatiotemporal gap gene evolution. A 1D linear domain represents the 35–92% AP axis, and replicates the domain used in previous models [13]. By scaling diffusion constants and choosing initial conditions, the 1D domain also represents the 0–100% AP length (). A 3D mesh modified from the VE geometry represents a realistic embryonic geometry. Though the embryonic syncytium includes the yolk interior of the embryo, nuclei are located within the periplasmic domain of the exterior surface [10], [49]. Cytoplasmic viscosity increases in the embryonic interior and is presumed to limit effective diffusion of gap gene products to the 2D layer in the periplasmic volume containing the nuclei. While some gap gene products may diffuse into yolk, this process may be considered as part of the decay terms, λ_a. We took this into account when constructing the 3D domain. The reaction-diffusion equations (eqns. 1–3) are implemented as weak form PDEs on a 2D manifold (Fig. S1); this manifold is “wrapped” around the 3D embryonic geometry in 3D model implementations(,,).

Though the 3D domain is a closed surface without AP flux boundaries, the partial () and full () 1D domains are bounded at both termini by zero-flux conditions. These internal boundaries are unrealistic in the case of the partial AP length domain as there are no such physical barriers in the embryo; they were introduced in previous gap gene models to help account for artifacts in previously inferred GRNs [14], [42]–[44]. In full length 1D models the anterior and posterior ends of the embryo are realistically represented by zero-flux boundaries.

Numerical integration of PDEs requires specification of initial conditions as well as boundary conditions. For purposes of model comparison, we chose initial conditions specified in previous models [13]. On both 1D and 3D domains, the proteins Gt, Kni, Kr, and Tll have initial uniform concentrations of zero. Jaeger et al. provide initial non-uniform 1D distributions for Cad and Hb (Fig. 3a) [13]. These distributions span the entire AP length and provide initial conditions for both the partial and full length domains. Jaeger et al. also provide a constant exponential 1D Bcd distribution for the full AP length. These 1D distributions were used as initial conditions in the 1D models ( and ). They were projected onto the 3D domain to approximate full 3D initial conditions (, Fig. 3b–d). This projection was performed using built-in interpolation tools in the Comsol package. Provided AP-coordinates and corresponding concentration values, Comsol created a linear interpolant of DV-symmetric concentration values along the AP-axis of the 3D geometry.

While the Bcd data provided by Jaeger et al. describes the lateral AP distribution of Bcd, it fails to capture the observed DV asymmetry found in embryonic Bcd. Though sufficient for a 1D model (Fig. 3a), the resulting 3D distribution (Fig. 3b) qualitatively disagrees with VE data (Fig. 3e). We therefore built an interpolating function from the VE Bcd data and used this interpolant when simulating the model (). Again, we used Comsol's interpolation functionality. However, this interpolant required full 3D specification of coordinates. We used the coordinates of nuclei and corresponding Bcd concentration values provided in the VE. Because the software does not support interpolation on a 2D boundary (the periplasmic space) in a 3D geometry, we used nearest-neighbor interpolation (Fig. 3e). Because this Bcd distribution is represented in the model as a static interpolant, noise in the data (and hence the interpolant) is not smoothed by diffusion and decay. Initial attempts at directly importing VE Bcd data resulted in persistent asymmetries and mottled distributions inconsistent with data (Fig. 4, column 3). In an ideal situation, inter-embryo variability would be averaged out of VE data. However, the data set was generated with few replicates (13 embryos for Bcd [49]) and spatial noise remained. To remove this noise from the interpolant, we first fit a steady-state source-diffusion-decay (SDD) model of Bcd production [18] to VE Bcd data on the 3D domain (Fig. 4a, column 1). Once we had obtained agreement between this regularized Bcd distribution and the data, we used the solution of the SDD model to create a new interpolant. This smoothed interpolant shown in Figure 3f and 's output (Fig. 4b–g, columns 4–5) compares favorably with the results (Fig. 4b–g, columns 3).

Spatiotemporal regulation of gap gene expression spans the mitotic nuclear division between nuclear cycle 13 and 14a. For purposes of comparison, we chose to simulate the same time-course as previous models. We begin by simulating the conclusion of cycle 13 for sixteen minutes, mitosis for five minutes, and continue to simulate cycle 14a for the remaining forty-nine minutes [13]. The reaction-diffusion equations (eqn. 1–3) describe the model during interphase. During mitosis, gene expression (the second term in eqn. 1) is set to zero. Molecules may diffuse and decay, but they are not transcribed or translated while the chromatin is compacted for mitotic division.

This set of initial and boundary conditions, coupled with the reaction-diffusion equations and a geometric domain, constitutes a numerically soluble model. To calculate model error, we used a straightforward root mean squared error cost function:(5)Here, θ is the GRN parameter set, n is the number of data points in the 35%–92% EL region of the embryo, a is the index of protein species, i is the index of n nuclear coordinates, and t is the time index. This function sums the root squared error between model output from a given GRN, c_a,mod(θ,i,t), and experimental data, c_x,exp(i,t), over data points i, model proteins a, and time t.

was originally fit to immunofluorescence data in Jaeger et al. [13]. As a result, both the model's concentration units and GRN parameters are scaled to reflect observed relative intensity ranges of those data. To facilitate fitting between models utilizing Jaeger et al. 's parameters and VE data, we pre-scaled the VE data to agree with the initial conditions reported by Jaeger et al. This was performed by optimizing scaling factors A_a and offsets b_a such that the difference between Jaeger et al.'s initial conditions and the VE data was minimized,(6)The resulting scaling was applied to the VE data, allowing for direct comparison of model outputs. VE protein data is unavailable for Cad and Tll. For the former, we substituted expression data used by Jaeger et al. to fit the original model [13]. For the latter, we substituted Tll mRNA data from the VE and scaled it according to eqn. 6.

Optimization

Using the cost function (eqn. 5), we optimized the full 1D and 3D models against scaled VE data using the Optimization Toolbox in MATLAB R2009a [72]. We began with local searches of the GRN weight matrix W (containing 42 parameters) using the constrained nonlinear minimization function fmincon(). We initialized these searches at the best-fit inferred GRN parameter set of the original modeling study and bounded all parameters within the interval [−0.2, 0.2] [13]. Parameter and cost function tolerances for stopping criteria were set to zero and the search was allowed to progress for 4200 model evaluations (100 evaluations per parameter), resulting in arrival at local minima. In the case of the DV-asymmetric Bcd model (), we subsequently included this locally optimal GRN in the initial population of a global search using genetic algorithms (GAs).

We used the GA as implemented in MATLAB. The population of size twenty genomes (parameter sets) was initialized with nineteen randomized parameter sets and the locally-optimized parameter set found for . Stopping criteria were specified as a maximum of 100 generations or failure to improve cost function values above a tolerance of 10⁻⁶. The latter criterion increments a “stall” counter for each generation that fails to improve the score, ending the GA when the counter reaches fifty [72]. This algorithm was used to search the parameter space while fitting the 3D model incorporating DV-asymmetric Bcd ().