English

Extremal function for Moser-Trudinger type Inequality with Logarithmic weight

Analysis of PDEs 2016-02-16 v1

Abstract

On the space of weighted radial Sobolev space, the following generalization of Moser-Trudinger type inequality was established by Calanchi and Ruf in dimension 2 : If β[0,1)\beta \in [0,1) and w0(x)=logxβw_0(x) = |\log |x||^\beta then supB\gradu2w01,uH0,rad1(w0,B)Beαu21βdx<, \sup_{\int_B |\grad u|^2w_0 \leq 1 , u \in H_{0,rad}^1(w_0,B)} \int_B e^{\alpha u^{\frac{2}{1-\beta}}} dx < \infty, if and only if ααβ=2[2π(1β)]11β.\alpha \leq \alpha_\beta = 2\left[2\pi (1-\beta) \right]^{\frac{1}{1-\beta}}. We prove the existence of an extremal function for the above inequality for the critical case when α=αβ\alpha = \alpha_\beta thereby generalizing the result of Carleson-Chang who proved the case when β=0\beta =0.

Keywords

Cite

@article{arxiv.1602.04585,
  title  = {Extremal function for Moser-Trudinger type Inequality with Logarithmic weight},
  author = {Prosenjit Roy},
  journal= {arXiv preprint arXiv:1602.04585},
  year   = {2016}
}

Comments

To appear in "Nonlinear Analysis- TMA"

R2 v1 2026-06-22T12:50:10.947Z