Convex-Cyclic Weighted Translations On Locally Compact Groups

Abstract

A bounded linear operator T on a Banach space X is called a convex-cyclic operator if there exists a vector x ∈ X such that the convex hull of Orb(T, x) is dense in X. In this paper, for given an aperiodic element g in a locally compact group G, we give some sufficient conditions for a weighted translation operator Tg,w: f w· f*δg on Lp(G) to be convex-cyclic. A necessary condition is also studied. At the end, to explain the obtained results, some examples are given.

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