Stable periodic orbits for delay differential equations with unimodal feedback

TL;DR

This paper demonstrates the existence of stable periodic orbits in certain delay differential equations with unimodal feedback, extending known results to more complex nonlinear functions and applications.

Contribution

It introduces a method to construct stable periodic orbits for delay differential equations with unimodal feedback by approximating the nonlinear function with a simpler one.

Findings

Stable periodic orbits exist for equations with nonlinear feedback close to a specific function.

Examples include equations modeling population dynamics and economic growth.

The orbits can have complex structures, indicating rich dynamical behavior.

Abstract

We consider delay differential equations of the form $ y'(t)=-ay(t)+bf(y(t-1)) $ with positive parameters $a,b$ and a unimodal $f:[0,\infty)\to [0,1]$. It is assumed that the nonlinear $f$ is close to a function $g:[0,\infty)\to [0,1]$ with $g(\xi)=0$ for all $\xi>1$. The fact $g(\xi)=0$ for all $\xi>1$ allows to construct stable periodic orbits for the equation $x'(t)=-cx(t)+dg(x(t-1))$ with some parameters $d>c>0$. Then it is shown that the equation $ y'(t)=-ay(t)+bf(y(t-1)) $ also has a stable periodic orbit provided $a,b,f$ are sufficiently close to $c,d,g$ in a certain sense. The examples include $f(\xi)=\frac{\xi^k}{1+\xi^n}$ for parameters $k>0$ and $n>0$ together with the discontinuous $g(\xi)=\xi^k$ for $\xi\in[0,1)$, and $g(\xi)=0$ for $\xi>1$. The case $k=1$ is the famous Mackey--Glass equation, the case $k>1$ appears in population models with Allee effect, and the case $k\in(0,1)$ arises in some economic growth models. The obtained stable periodic orbits may have complicated structures.