Publication | Closed Access
Biological Pattern Formation on Two-Dimensional Spatial Domains: A Nonlinear Bifurcation Analysis
45
Citations
16
References
1997
Year
EngineeringBiomedical EngineeringComputational MechanicsTissue Interaction ModelTwo-dimensional SpatialBiological Pattern FormationBiomechanicsPrimary BifurcationPeriodic Travelling WaveNonlinear Bifurcation AnalysisBiophysicsChaos TheoryBifurcation TheoryComplex DynamicBiologyPattern FormationComputational NeuroscienceMedicineNonlinear OscillationMultiscale Modeling
A tissue interaction model for skin organ pattern formation is presented. Possible spatially patterned solutions on rectangular domains are investigated. Linear stability analysis suggests that the model can exhibit pattern formation. A weakly nonlinear two-dimensional perturbation analysis is then carried out. This demonstrates that when bifurcation occurs via a simple eigenvalue, patterns such as rolls, squares, and rhombi can be supported by the model equations. Our nonlinear analysis shows that more complex patterns are also possible if bifurcation occurs via a double eigenvalue. Surprisingly, hexagonal patterns could not develop from a primary bifurcation.
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