Explicit constants in Lp-Hardy inequalities for Aharonov-Bohm potentials

Abstract

For the two-dimensional Aharonov-Bohm potential Aβ with flux β and 1<p<2, Cazacu, Krejčiř\'ık, Lam and Laptev proved by a compactness argument that their constant λβ(p) in the Lp-Hardy inequality strictly exceeds the free constant (2-pp)p, and asked for a constructive proof with explicit estimates and for comparability of λβ(p) with a quantity depending on dist(β,Z). We answer both questions by using a compactness-free two-sided bound for the twisted angular constant. Our explicit Hardy constant is [(2-pp)2+((πdist(β,Z))π)2]p/2, 1<p<2. As a byproduct we observe that when p 2 the Aharonov--Bohm field produces an Lp-Hardy inequality with the usual homogeneous weight |x|-p. Our approach also provides new Lp-Hardy inequalities with explicit constants for the complex AB potentials.

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