Dynamical properties of discrete negative feedback models

Author:

Shousuke Ohmori, Yoshihiro Yamazaki

Keyword:

Nonlinear Sciences, Chaotic Dynamics, Chaotic Dynamics (nlin.CD), Dynamical Systems (math.DS)

journal:

date:

2023-05-09 16:00:00

Abstract

Dynamical properties of tropically discretized and max-plus negative feedback models are investigated. Reviewing the previous study [S. Gibo and H. Ito, J. Theor. Biol. 378, 89 (2015)], the conditions under which the Neimark-Sacker bifurcation occurs are rederived with a different approach from their previous one. Furthermore, for limit cycles of the tropically discretized model, it is found that ultradiscrete state emerges when the time interval in the model becomes large. For the max-plus model, we find the two limit cycles; one is stable and the other is unstable. The dynamical properties of these limit cycles can be characterized by using the Poincar\'e map method. Relationship between ultradiscrete limit cycle states for the tropically discretized and the max-plus models is also discussed.

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