Sharp Inequalities for maximal operators on finite graphs

Abstract

Let G=(V,E) be a finite graph and MG be the centered Hardy-Littlewood maximal operator defined there. We find the optimal value CG,p such that the inequality Varp(MGf)≤ CG,pVarp(f) holds for every f:V R, where Varp stands for the p-variation, when: (i) G=Kn (complete graph) and p∈ [(4)(6),∞) or G=K4 and p∈ (0,∞); (ii) G=Sn (star graph) and 1 p 12; p∈ (0,12) and n C(p) or G=S3 and p∈ (1,∞). We also find the value of the norm \|MG\|2 when: (i) G=Kn and n 3; (ii) G=Sn and n 3.