On a class of anisotropic Muckenhoupt weights and their applications to p-Laplace equations

Abstract

In this paper, a class of anisotropic weights having the form of |x'|θ1|x|θ2|xn|θ3 in dimensions n≥2 is considered, where x=(x',xn) and x'=(x1,...,xn-1). We first find the optimal range of (θ1,θ2,θ3) such that this type of weights belongs to the Muckenhoupt class Ap. Then we further study its doubling property, which shows that it provides an example of a doubling measure but is not in Ap. As a consequence, we obtain anisotropic weighted Poincar\'e and Sobolev inequalities, which are used to study the local behavior for solutions to non-homogeneous weighted p-Laplace equations.

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