English

A Hardy-Moser-Trudinger inequality

Analysis of PDEs 2013-03-25 v1

Abstract

In this paper we obtain an inequality on the unit disc BB 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>0C_0>0 such that Be4πu2H(u)dxC0<,  uC0(B), \int_B e^{\frac {4\pi u^2}{H(u)}} dx \le C_0 < \infty, \quad \forall\; u\in C^\infty_0(B), where H(u):=B\nu2dxBu2(1x2)2dx.H(u) := \int_B |\n u|^2 dx - \int_B \frac {u^2}{(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.

Keywords

Cite

@article{arxiv.1012.5591,
  title  = {A Hardy-Moser-Trudinger inequality},
  author = {Guofang Wang and Dong Ye},
  journal= {arXiv preprint arXiv:1012.5591},
  year   = {2013}
}

Comments

18 pages

R2 v1 2026-06-21T17:04:27.220Z