A generalized weighted Hardy-Ces\`aro operator, and its commutator on weighted Lp and BMO spaces

Abstract

In this paper, we introduce a new weighted Hardy-Ces\`aro operator defined by U,sf(x)=∫01 f(s(t)· x) (t)dt, which is associated to the parameter curve s(t,x)=s(t)x. Under certain conditions on s(t) and on an absolutely homogeneous weight function ω, we characterize the weight function such that U,s is bounded on Lp(ω), BMO(ω). The corresponding operator norms are worked out too. These results extend the ones of Jie Xiao xiao. We also give a sufficient and a necessary condition on the weight function , which ensure the boundedness of the commutators of operator U,s on Lp(ω) with symbols in BMO(ω).