Litcius/Paper detail

Ultradiscrete bifurcations for one dimensional dynamical systems

Shousuke Ohmori, Yoshihiro Yamazaki

2020Journal of Mathematical Physics10 citationsDOIOpen Access PDF

Abstract

Bifurcations of one dimensional dynamical systems are discussed based on some ultradiscrete equations. The ultradiscrete equations are derived from normal forms of one-dimensional nonlinear differential equations, each of which has saddle-node, transcritical, or supercritical pitchfork bifurcations. An additional bifurcation, which is similar to the flip bifurcation, is found in ultradiscrete equations for supercritical pitchfork bifurcations. Dynamical properties of these ultradiscrete bifurcations can be characterized with graphical analysis. As an example of application of our treatment, we focus on an ultradiscrete equation of the FitzHugh–Nagumo model and discuss its dynamical properties.

Topics & Concepts

Pitchfork bifurcationBifurcationMathematicsNonlinear systemDynamical systems theoryApplied mathematicsSaddle-node bifurcationFocus (optics)Mathematical analysisPhysicsQuantum mechanicsOpticsNonlinear Dynamics and Pattern FormationQuantum chaos and dynamical systemsNonlinear Photonic Systems
Ultradiscrete bifurcations for one dimensional dynamical systems | Litcius