A common variable minimax theorem for graphs
Abstract
Let G = \G1 = (V, E1), …, Gm = (V, Em)\ be a collection of m graphs defined on a common set of vertices V but with different edge sets E1, …, Em. Informally, a function f :V → R is smooth with respect to Gk = (V,Ek) if f(u) f(v) whenever (u, v) ∈ Ek. We study the problem of understanding whether there exists a nonconstant function that is smooth with respect to all graphs in G, simultaneously, and how to find it if it exists.
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