Boundedness for fractional Hardy-type operator on Herz-Morrey spaces with variable exponent

Abstract

In this paper, the fractional Hardy-type operator of variable order β(x) is shown to be bounded from the Herz-Morrey spaces MKp_1,q_1(·)α,λ(Rn) with variable exponent q1(x) into the weighted space MKp_2,q_2(·)α,λ(Rn,ω), where ω=(1+|x|)-γ(x) with some γ(x)>0 and 1/q_1(x)-1/q_2(x)=β(x)/n when q_1(x) is not necessarily constant at infinity. It is assumed that the exponent q_1(x) satisfies the logarithmic continuity condition both locally and at infinity that 1< q1(∞) q1(x)( q1)+<∞~(x∈ Rn).