Superlinear elliptic inequalities on weighted graphs

Abstract

Let (V,μ) 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 equation* u+uσ≤0 in\,\,V, equation* where is the standard graph Laplacian on V and σ>0. For σ∈(0,1], the inequality admits no nontrivial positive solution. For σ>1, assuming condition (p0) on (V,μ), we obtain a sharp condition for nonexistence of positive solutions in terms of the volume growth of the graph, that is equation* μ(o,n) n2σσ-1( n)1σ-1 equation* for some o∈ V and all large enough n. For any >0, we can construct an example on a homogeneous tree TN with μ(o,n)≈ n2σσ-1( n)1σ-1+, and a solution to the inequality on ( TN,μ) to illustrate the sharpness of 2σσ-1 and 1σ-1.