Noninvertibility and Bifurcation Phenomena in a Four-Partitions Piecewise Linear Map
Abstract
This paper investigates the global dynamics and bifurcation structures of a two-dimensional piecewise linear map defined by four partitions, involving absolute value terms for both state variables.
We analyze the stability of fixed points and demonstrate that the emergence of period-2 dynamics is initiated by a Flip bifurcation.
A detailed analysis of these cycles reveals a unique branch manifesting in two topologically distinct configurations, connected via a Border Collision Bifurcation.
Furthermore, we show that higher-period cycles (period 3 and 4) emerge in stable-saddle pairs through Fold Border Collision Bifurcations, leading to regions of multistability organized by the stable manifolds of saddle orbits.
Finally, we examine the degenerate parameter regime where the system reduces to a one-dimensional discontinuous map.
In this case, we prove the existence of an absorbing invariant interval and identify parameter regions exhibiting robust chaotic dynamics.
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