J-class weighted translations on locally compact groups

Abstract

A bounded linear operator T on a Banach space X (not necessarily separable) is said to be J-class operator whenever the extended limit set, say JT(x) equals X for some vector x∈ X. Practically, the extended limit sets localize the dynamical behavior of operators. In this paper, using the extended limit sets we will examine the necessary and sufficient conditions for the weighted translation Ta,ω to be J-class on a locally compact group G, within the setting of Lp-spaces for 1 ≤ p < ∞ . Precisely, we delineate the boundary between J-class and hypercyclic behavior for weighted translations. Then, we will show that for torsion elements in locally compact groups, unlike the case of non-dense orbits of weighted translations, we have JTa,ω(0)=Lp(G). Finally, we will provide some examples on which the weighted translation Ta,ω is J-class but it fails to be hypercyclic.