Existence theorems for a generalized Chern-Simons equation on finite graphs
Abstract
Denote by G=(V,E) a finite graph. We study a generalized Chern-Simons equation u=λ eu(ebu-1)+4πΣj=1Nδpj on G, where λ and b are positive constants; N is a positive integer; p1, p2, ···, pN are distinct vertices of V and δpj is the Dirac delta mass at pj. We prove that there exists a critical value λc such that the equation has a solution if λ≥ λc and the equation has no solution if λ<λc. We also prove that if λ>λc the equation has at least two solutions which include a local minimizer for the corresponding functional and a mountain-pass type solution.
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