6533b872fe1ef96bd12d435c

RESEARCH PRODUCT

The structure of the moduli spaces of toric dynamical systems

Gheorghe CraciunJiaxin JinMiruna-stefana Sorea

subject

Mathematics - Algebraic Geometry14P05 14P10 14Q30 34D23 34C08 37E99 92C42FOS: MathematicsDynamical Systems (math.DS)Mathematics - Dynamical SystemsAlgebraic Geometry (math.AG)

description

We consider complex-balanced mass-action systems, or toric dynamical systems. They are remarkably stable polynomial dynamical systems arising from reaction networks seen as Euclidean embedded graphs. We study the moduli spaces of toric dynamical systems, called the toric locus: given a reaction network, we are interested in the topological structure of the set of parameters giving rise to toric dynamical systems. First we show that the complex-balanced equilibria depend continuously on the parameter values. Using this result, we prove that the toric locus of any toric dynamical system is connected. In particular, we emphasize its product structure: it is homeomorphic to the product of the set of complex-balanced flux vectors and the affine invariant polyhedron. Finally, we show that the toric locus is invariant with respect to bijective affine transformations of the generating reaction network.

yearjournalcountryeditionlanguage
2023-03-31
http://arxiv.org/abs/2303.18102