A Hardy-Moser-Trudinger inequality

Abstract

In this paper we obtain an inequality on the unit disc B in the plane, which improves the classical Moser-Trudinger inequality and the classical Hardy inequality at the same time. Namely, there exists a constant C0>0 such that \[ ∫B e 4π u2H(u) dx C0 < ∞, ∀\; u∈ C∞0(B),\] where H(u) := ∫B | u|2 dx - ∫B u2(1-|x|2)2 dx. This inequality is a two dimensional analog of the Hardy-Sobolev-Maz'ya inequality in higher dimensions, which was recently intensively studied. We also prove that the supremum is achieved in a suitable function space, which is an analog of the celebrated result of Carleson-Chang for the Moser-Trudinger inequality.