A minimizing problem of a polyharmonic operator with Critical Exponent
Analysis of PDEs
2022-02-22 v1
Abstract
In this work, we study the two following minimization problems for , \begin{equation*} \begin{array}{ccc} S_{0,r}(\varphi)=\displaystyle\inf_{u\in H_{0}^{r}(\Omega)\,|u+\varphi\|_{L^{2^{*r}}}=1}\|u\|_{r}^{2}& \textrm{and}& S_{\theta,r}(\varphi)=\displaystyle\inf_{u\in H_{\theta}^{r}(\Omega)\, \|u+\varphi\|_{L^{2^{*r}}}=1}\|u\|_{r}^{2}, \end{array} \end{equation*} where , is a smooth bounded domain, , and the norm where if is even and where if is odd. Firstly, we prove that, when the infimum in and are attained. Secondly, we show that for a large class of .
Cite
@article{arxiv.2202.09404,
title = {A minimizing problem of a polyharmonic operator with Critical Exponent},
author = {Asma Benhamida Rejeb Hadiji and Habib Yazidi},
journal= {arXiv preprint arXiv:2202.09404},
year = {2022}
}