Effects of localized spatial variations on the uniform persistence and spreading speeds of time periodic two species competition systems

TL;DR

This paper investigates how localized spatial variations influence the persistence and spreading speeds of a time-periodic two-species competition system, showing that such variations do not affect persistence or spreading speeds under certain conditions.

Contribution

It demonstrates that localized spatial variations do not impact the uniform persistence or spreading speeds of the system, under specific linear determinant conditions.

Findings

Localized variations do not affect system persistence.

Spreading speeds remain unchanged by localized variations.

Under certain conditions, variations do not accelerate spreading speeds.

Abstract

The current paper is devoted to the study of two species competition systems of the form \begin{equation*} \begin{cases} u_t(t,x)= \mathcal{A} u+u(a_1(t,x)-b_1(t,x)u-c_1(t,x)v),\quad x\in\RR\cr v_t(t,x)= \mathcal{A} v+ v(a_2(t,x)-b_2(t,x)u-c_2(t,x) v),\quad x\in\RR \end{cases} \end{equation*} where $\mathcal{A}u=u_{xx}$, or $(\mathcal{A}u)(t,x)=\int_{\RR}\kappa(y-x)u(t,y)dy-u(t,x)$ ($\kappa(\cdot)$ is a smooth non-negative convolution kernel supported on an interval centered at the origin), $a_i(t+T,x)=a_i(t,x)$, $b_i(t+T,x)=b_i(t,x)$, $c_i(t+T,x)=c_i(t,x)$, and $a_i$, $b_i$, and $c_i$ ($i=1,2$) are spatially homogeneous when $|x|\gg 1$, that is, $a_i(t,x)=a_i^0(t)$, $b_i(t,x)=b_i^0(t)$, $c_i(t,x)=c_i^0(t)$ for some $a_i^0(t)$, $b_i^0(t)$, $c_i^0(t)$, and $|x|\gg 1$. Such a system can be viewed as a time periodic competition system subject to certain localized spatial variations. We, in particular, study the effects of localized spatial variations on the uniform persistence and spreading speeds of the system. Among others, it is proved that any localized spatial variation does not affect the uniform persistence of the system, does not slow down the spreading speeds of the system, and under some linear determinant condition, does not speed up the spreading speeds.