Maximal, potential and singular operators in the local "complementary" variable exponent Morrey type spaces

Abstract

We consider local "complementary" generalized Morrey spaces M\x0\p(·),() in which the p-means of function are controlled over B(x0,r) instead of B(x0,r), where ⊂ is a bounded open set, p(x) is a variable exponent, and no monotonicity type conditio is imposed onto the function (r) defining the "complementary" Morrey-type norm. In the case where is a power function, we reveal the relation of these spaces to weighted Lebesgue spaces. In the general case we prove the boundedness of the Hardy-Littlewood maximal operator and Calderon-Zygmund singular operators with standard kernel, in such spaces. We also prove a Sobolev type M\x0\p(·), ()→ M\x0\q(·), ()-theorem for the potential operators I(·), also of variable order. In all the cases the conditions for the boundedness are given it terms of Zygmund-type integral inequalities on (r), which do not assume any assumption on monotonicity of (r).