Weighted Boundedness of the Maximal, Singular and Potential Operators in Variable Exponent Spaces

Abstract

We present a brief survey of recent results on boundedness of some classical operators within the frameworks of weighted spaces Lp(·)() with variable exponent p(x), mainly in the Euclidean setting and dwell on a new result of the boundedness of the Hardy-Littlewood maximal operator in the space Lp(·)(X,) over a metric measure space X satisfying the doubling condition. In the case where X is bounded, the weight function satisfies a certain version of a general Muckenhoupt-type condition For a bounded or unbounded X we also consider a class of weights of the form (x)=[1+d(x0,x)]∞Πk=1m wk(d(x,xk)), xk∈ X, where the functions wk(r) have finite upper and lower indices m(wk) and M(wk). Some of the results are new even in the case of constant p.