Topological degree for Chern-Simons Higgs models on finite graphs

Abstract

Let (V,E) be a finite connected graph. We are concerned about the Chern-Simons Higgs model u=λ eu(eu-1)+f, (0.1) where is the graph Laplacian, λ is a real number and f is a function on V. When λ>0 and f=4πΣi=1Nδpi, N∈N, p1,·s,pN∈ V, the equation (0.1) was investigated by Huang, Lin, Yau (Commun. Math. Phys. 377 (2020) 613-621) and Hou, Sun (Calc. Var. 61 (2022) 139) via the upper and lower solutions principle. We now consider an arbitrary real number λ and a general function f, whose integral mean is denoted by f, and prove that when λf<0, the equation (0.1) has a solution; when λf>0, there exist two critical numbers >0 and <0 such that if λ∈(,+∞)(-∞,), then (0.1) has at least two solutions, including one local minimum solution; if λ∈(0,)(,0), then (0.1) has no solution; while if λ= or , then (0.1) has at least one solution. Our method is calculating the topological degree and using the relation between the degree and the critical group of a related functional. Similar method is also applied to the Chern-Simons Higgs system, and a partial result for the multiple solutions of the system is obtained.