Semilinear heat equations and parabolic variational inequalities on graphs
Abstract
Let G=(V,E) be a locally finite connected weighted graph, and be an unbounded subset of V. Using Rothe's method, we study the existence of solutions for the semilinear heat equation ∂tu+|u|p-1· u= u~(p1) and the parabolic variational inequality eqnarray* ∫ ∂tu·(v-u)\,dμ ∫( u+f)·(v-u)\,dμ for any v∈ H, eqnarray* where H=\u∈ W1,2(V):u=0 on V\.
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