Multipolar Hardy inequalities and mutual interaction of the poles

Abstract

In this paper we state the weighted Hardy inequality equation* c∫ RNΣi=1n 2 |x-ai|2\, μ(x)dx ∫ RN |∇|2 \, μ(x)dx +k ∫RN2 \, μ(x)dx equation* for any in a weighted Sobolev spaces, with c∈]0,co[ where co=co(N,μ) is the optimal constant, a1,…,an∈ RN, k is a constant depending on μ. We show the relation between c and the closeness to the single pole. To this aim we analyze in detail the difficulties to be overcome to get the inequality.