Numerical Analysis of Steady State Patterns in Cell-Based Auxin Transport Models

Authors

  • Delphine Draelants* Universiteit Antwerpen
  • Przemyslaw Klosiewicz Universiteit Antwerpen
  • Jan Broeckhove Universiteit Antwerpen
  • Gerrit T.S. Beemster Universiteit Antwerpen
  • Wim Vanroose Universiteit Antwerpen

DOI:

https://doi.org/10.11145/95

Abstract

Cell-based models that describe the pattern formation and the flow of chemicals in plant organs are important building blocks in a multiscale simulation of a whole plant. An example of an important mechanism is the transport of the hormone auxin throughout the plant's organs because it is closely related to the growth characteristics of roots, shoots and leaves. Based on experimental evidence, a number of cell-based auxin transport models were developed. Due to the intercellular transport of chemicals, these models are complex dynamical systems with a large set of endogenous and exogenous parameters. The models share underlying mathematicalprinciples w.r.t. steady state pattern formation which plays a central role in the growth and development of plant organs. This calls for a uniform computational approach. In our research we focus on computer simulations of general cell-based transport models and more specically we use numerical bifurcation analysis to study the steady state patterns. It indicates how the stability ofpatterns is lost or gained as the system parameters change. Bifurcation analysis of ODEs is widespread in biology and various numerical tools produce bifurcation diagrams. However, these automatic tools do not work for large scale problems, such as biological patterning. Indeed, realistic simulations of large tissues that take multiple interacting chemicals into account give rise to very large and sparse systems of coupled ODEs. We analyze recent large scale transport models with new mathematical and computational tools that enable quantitative prediction of the bifurcations that appear at the macroscopic level in these models. This allows us to predict the patterns and self-similar solutions that appear during organ growth and to see how their stability changes as endogenous parameters are modified or as externally applied changes are enforced. We use these methods to compare the model output with observed data such as the auxin distribution and venation patterns in leaves in order to get a better understanding of the processes that regulate organ development in plants.

Author Biographies

Delphine Draelants*, Universiteit Antwerpen

PhD Student at the department of Mathematics and Computer Science

Przemyslaw Klosiewicz, Universiteit Antwerpen

Postdoctoral researcher at the department of Mathematics and Computer Science

Jan Broeckhove, Universiteit Antwerpen

Professor at the department of Mathematics and Computer Science

Gerrit T.S. Beemster, Universiteit Antwerpen

Professor at the department of Biology

Wim Vanroose, Universiteit Antwerpen

professor at the department of Mathematics and Computer Science

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Published

2013-04-27

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Section

Conference Contributions