Inequalities for doubly nonnegative functions
Abstract
Let g be a bounded symmetric measurable nonnegative function on [0,1]2, and g = ∫[0,1]2 g(x,y) dx dy. For a graph G with vertices \v1,v2,…,vn\ and edge set E(G), we define \[ t(G,g) \; = \; ∫[0,1]n Π\vi,vj\ ∈ E(G) g(xi,xj) \: dx1 dx2 ·s dxn \; . \] We conjecture that t(G,g) ≥ g |E(G)| holds for any graph G and any function g with nonnegative spectrum. We prove this conjecture for various graphs G, including complete graphs, unicyclic and bicyclic graphs, as well as graphs with 5 vertices or less.
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