Sharp Poincare-Wirtinger inequalities on complete graphs
Abstract
Let Kn=(V,E) be the complete graph with n≥ 3 vertices (here V and E denote the set of vertices and edges of Kn respectively). We find the optimal value Cn,p such that the inequality \|f-mf\|p Cn,p Varpf holds for every f:V R, where Varp stands for the p-variation, and mf stands for the average value of f, for all p∈[1,3+δ1n) (3+δ2n,+∞), for δ1n=12n2(n)+O(1/n3) and δ2n=2n+O(1/n2). Moreover, we characterize all the maximizer functions in that case. The behavior of the maximizers is different in each of the intervals (1,2), (2,3+δ1n) and (3+δ2n,∞).
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