Calculus on Graphs
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The purpose of this paper is to develop a "calculus" on graphs that allows graph theory to have new connections to analysis. For example, our framework gives rise to many new partial differential equations on graphs, most notably a new (Laplacian based) wave equation; this wave equation gives rise to a partial improvement on the Chung-Faber-Manteuffel diameter/eigenvalue bound in graph theory, and the Chung-Grigoryan-Yau and (in a certain case) Bobkov-Ledoux distance/eigenvalue bounds in analysis. Our framework also allows most techniques for the non-linear p-Laplacian in analysis to be easily carried over to graph theory.
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Nonexistence results for semilinear elliptic equations on metric graphs
Nonnegative or sign-changing solutions to semilinear elliptic equations on metric graphs with positive potential are only the trivial zero solution under suitable volume growth conditions.
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