Global stability for the 2-dimensional logistic map

J\'anos Dud\'as

arXiv:1808.00409·math.DS·August 2, 2018

Global stability for the 2-dimensional logistic map

J\'anos Dud\'as

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TL;DR

This paper proves that the nontrivial fixed point of a delayed logistic map is globally stable for parameter values where it is locally stable, using analytical and numerical methods to establish global attraction in a positive quadrant.

Contribution

It establishes the global stability of the fixed point for the delayed logistic map within a specific parameter range, extending known local stability results.

Findings

01

The fixed point is globally stable for 1 < a ≤ 2.

02

The stability holds for all initial conditions in a positive subset.

03

Analytical and numerical methods confirm global attraction.

Abstract

For the delayed logistic equation $x_{n + 1} = a x_{n} (a - x_{n - 1})$ it is well known that the nontrivial fixed point is locally stable for $1 < a \leq 2$ , and unstable for $a > 2$ . We prove that for $1 < a \leq 2$ the fixed point is globally stable, in the sense that it is locally stable and attracts all points of $S$ , where $S$ contains those $(x_{0}, x_{1}) \in R_{+}^{2}$ , for which the sequence ${x_{n}} \subset R_{+}$ . The proof is a combination of analytical and reliable numerical methods.

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Taxonomy

TopicsMathematical and Theoretical Epidemiology and Ecology Models · Advanced Differential Equations and Dynamical Systems · Stability and Controllability of Differential Equations