Abstract:
For two dynamical systems of dimensions 4 and 5 which simulate circular gene networks with non-linear degradation of their components we find conditions for existence of periodic trajectories and construct invariant domains which contain all these trajectories. Interiors of both domains are homeomorphic to torus, and the boundary of each of them contains a unique equilibrium point of the corresponding dynamical system.
Keywords:circular gene network model, phase portrait of non-linear dynamical system, equilibrium point, invariant domain, periodic trajectory.
Fulltext:
PDF file (262 kB)