English

On a $p$--Laplace equation with multiple critical nonlinearities

Analysis of PDEs 2008-09-18 v2

Abstract

Using the Mountain--Pass Theorem of Ambrosetti and Rabinowitz we prove that Δpuμxpup1=xsu\crits1+u\crit1-\Delta_p u-\mu|x|^{-p}{u^{p-1}}=|x|^{-s}{u^{\crits-1}}+u^{\crit-1} admits a positive weak solution in \rn\rn of class \dunpC1(\rn{0})\dunp\cap C^1(\rn\setminus\{0\}), whenever μ<μ1\mu<\mu_1, and μ1=[(np)/p]p\mu_1=[(n-p)/p]^p. The technique is based on the existence of extremals of some Hardy--Sobolev type embeddings of independent interest. We also show that if u\dunpu\in\dunp is a weak solution in \rn\rn of Δpuμxpup2u=xsu\crits2u+uq2u-\Delta_p u-\mu|x|^{-p}{|u|^{p-2}u}=|x|^{-s}{|u|^{\crits-2}u}+|u|^{q-2}u, then u0u\equiv0 when either 1<q<\crit1<q<\crit, or q>\critq>\crit and uu is also of class Lloc(\rn{0})L^\infty_\text{\scriptsize{loc}}(\rn\setminus\{0\}).

Keywords

Cite

@article{arxiv.0807.0913,
  title  = {On a $p$--Laplace equation with multiple critical nonlinearities},
  author = {Roberta Filippucci and Patrizia Pucci and Frédéric Robert},
  journal= {arXiv preprint arXiv:0807.0913},
  year   = {2008}
}

Comments

26 pages

R2 v1 2026-06-21T10:57:51.294Z