Dilation-commuting operators on power-weighted Orlicz classes

Abstract

Let 1 and 2 be nondecreasing functions from R+=(0,∞) onto itself. For i=1,2 and γ ∈ R, define the Orlicz class L_i(R+) to be the set of Lebesgue-measurable functions f on R+ such that equation* ∫R+ i ( k|(Tf)(t)| ) tγdt < ∞ equation* for some k>0. Our goal in this paper is to find conditions on 1, 2, γ and an operator T so that the assertions equation T : L_2,tγ(R+) → L_1,tγ(R+), I equation and equationmodularA ∫R+ 1 ( |(Tf)(t)| )tγdt ≤ K ∫R+ 2 ( K|f(s)| )sγds, M equation in which K>0 is independent of f, say, simple on R+, are equivalent and to then find necessary and sufficient conditions in order that (modularA) holds.