Hardy and Rellich inequalities with Bessel pairs
Abstract
In this paper, we establish suitable characterisations for a pair of functions (W(x),H(x)) on a bounded, connected domain ⊂ Rn in order to have the following Hardy inequality equation* ∫ W(x) |∇ u|A2 dx ≥ ∫ |∇ d|2AH(x)|u|2 dx, \,\,\, u ∈ C10(), equation* where d(x) is a suitable quasi-norm (gauge), ||2A = A(x), for ∈ Rn and A(x) is an n× n symmetric, uniformly positive definite matrix defined on a bounded domain ⊂ Rn. We also give its Lp analogue. As a consequence, we present examples for a standard Laplacian on Rn, Baouendi-Grushin operator, and sub-Laplacians on the Heisenberg group, the Engel group and the Cartan group. Those kind of characterisations for a pair of functions (W(x),H(x)) are obtained also for the Rellich inequality. These results answer the open problems of Ghoussoub-Moradifam GMbook.
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