Dynamical analysis of r-Chialvo neuron map with cosine memristive

TL;DR

This paper introduces a novel two-dimensional neuron map with a cosine memristor, revealing complex bifurcation patterns, multistability, and spatiotemporal phenomena, advancing the understanding of neurodynamics.

Contribution

It develops a new discrete neuron model incorporating a cosine memristor and explores its rich dynamical behaviors and network patterns.

Findings

The model exhibits diverse bifurcations including Neimark-Sacker and period-doubling.

Coexistence of multiple attractors such as limit cycles, periodic, and chaotic states.

Network analysis reveals complex patterns like chimera states and imperfect synchronization.

Abstract

In this work, we construct a novel two-dimensional discrete neuron map by incorporating a cosine-based memristor into the reduced Chialvo neuron map to examine the dynamical analysis of electromagnetic modulation. The nonlinear current-voltage characteristics of the memristor enrich the neuron map's behavior, leading to diverse firing regimes, stability behaviors, and chaotic attractors. This study begins to establish the equilibrium points using both analytical and numerical methods. Additionally, we determine the conditions on parameters under which the proposed map exhibits a Neimark-Sacker bifurcation. Further, the numerical study reveals the antimonotonicity structure through the forward and backward bifurcation diagrams. The model exhibits a wide range of codimension-one and codimension-two bifurcation patterns, including Neimark-Sacker, period-doubling, saddle-node, generalized period-doubling, cusp-point, fold-flip, and various resonance structures (1:1, 1:2, 1:3, and 1:4). We also observe that the coexistence of multistable attractors including a stable limit cycle, a period-five attractor, and a chaotic attractor, along with their respective basins of attraction. Furthermore, we extend this analysis to the network of neurons under the ring-star configuration and discuss several spatiotemporal patterns. This network investigation reveals complex collective patterns, including imperfect synchronization, clustered patterns, and multi-chimera state phenomena, which have not been previously observed in existing Chialvo-based studies. These results highlight the potential of the discrete memristor-based neuron map for advancing theoretical neurodynamics and offer a robust framework for investigating low-dimensional yet dynamically rich neuron systems.