Multiple solutions of Kazdan-Warner equation on graphs in the negative case

Abstract

Let G=(V,E) be a finite connected graph, and let : V→ R be a function such that ∫V dμ<0. We consider the following Kazdan-Warner equation on G:\[ u+-Kλ e2u=0,\] where Kλ=K+λ and K: V→ R is a non-constant function satisfying x∈ VK(x)=0 and λ∈ R. By a variational method, we prove that there exists a λ*>0 such that when λ∈(-∞,λ*] the above equation has solutions, and has no solution when λ≥ λ. In particular, it has only one solution if λ≤ 0; at least two distinct solutions if 0<λ<λ*; at least one solution if λ=λ. This result complements earlier work of Grigor'yan-Lin-Yang GLY16, and is viewed as a discrete analog of that of Ding-Liu DL95 and Yang-Zhu YZ19 on manifolds.