Superlinear elliptic inequalities on weighted graphs

TL;DR

This paper investigates the existence of positive solutions to a semi-linear elliptic inequality on weighted graphs, establishing sharp conditions based on volume growth for different ranges of the parameter .

Contribution

It provides a precise volume growth criterion for the nonexistence of positive solutions when >1, and constructs examples demonstrating the sharpness of these conditions.

Findings

No positive solutions for ;1.

Sharp volume growth conditions for >1.

Examples on homogeneous trees illustrating sharpness.

Abstract

Let $(V,\mu)$ be an infinite, connected, locally finite weighted graph. We study the problem of existence or non-existence of positive solutions to a semi-linear elliptic inequality \begin{equation*} \Delta u+u^{\sigma}\leq0\quad \text{in}\,\,V, \end{equation*} where $\Delta$ is the standard graph Laplacian on $V$ and $\sigma>0$. For $\sigma\in(0,1]$, the inequality admits no nontrivial positive solution. For $\sigma>1$, assuming condition \textbf{($p_0$)} on $(V,\mu)$, we obtain a sharp condition for nonexistence of positive solutions in terms of the volume growth of the graph, that is \begin{equation*} \mu(o,n)\lesssim n^{\frac{2\sigma}{\sigma-1}}(\ln n)^{\frac{1}{\sigma-1}} \end{equation*} for some $o\in V$ and all large enough $n$. For any $\varepsilon>0$, we can construct an example on a homogeneous tree $\mathbb T_N$ with $\mu(o,n)\approx n^{\frac{2\sigma}{\sigma-1}}(\ln n)^{\frac{1}{\sigma-1}+\varepsilon}$, and a solution to the inequality on $(\mathbb T_N,\mu)$ to illustrate the sharpness of $\frac{2\sigma}{\sigma-1}$ and $\frac{1}{\sigma-1}$.