Multipolar potentials and weighted Hardy inequalities

Abstract

abstract In this paper we state the following weighted Hardy type inequality for any functions in a weighted Sobolev space and for weight functions μ of a quite general type equation* cN,μ ∫NV\,2μ(x)dx ∫N|∇ |2μ(x)dx +Cμ ∫NW 2μ(x)dx, equation* where V is a multipolar potential and W is a bounded function from above depending on μ. The method to get the result is based on the introduction of a suitable vector value function and on an integral identity that we state in the paper. We prove that the constant cN,μ in the estimate is optimal by building a suitable sequence of functions. abstract

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