English

Minimization problem associated with an improved Hardy-Sobolev type inequality

Analysis of PDEs 2020-03-20 v3

Abstract

We consider the existence and the non-existence of a minimizer of the following minimization problems associated with an improved Hardy-Sobolev type inequality introduced by Ioku. Ia:=infuW01,p(BR){0}BRupdx(BRup(s)Va(x)dx)pp(s),whereVa(x)=1xs(1a(xR)Npp1)β1xs. I_a := \inf_{u \in W_0^{1,p}(B_R ) \setminus \{ 0\} } \frac{\int_{B_R} |\nabla u |^{p} \,dx}{\left( \int_{B_R} |u|^{p^*(s)} V_a(x) \,dx \right)^{\frac{p}{p^*(s)}}}, \,\,\text{where}\,\, V_a (x) =\frac{1}{|x|^s \left( 1- a \,\left( \frac{|x|}{R} \right)^{\frac{N-p}{p-1}} \right)^\beta} \ge \frac{1}{|x|^s}. Only for radial functions, the minimization problem IaI_a is equivalent to it associated with the classical Hardy-Sobolev inequality on RN\mathbb{R}^N via a transformation. First, we summarize various transformations including that transformation and give a viewpoint of such transformations. As an application of this viewpoint, we derive {\it an infinite dimensional form} of the classical Sobolev inequality in some sense. Next, without the transformation, we investigate the minimization problems IaI_a on balls BRB_R. In contrast to the classical results for a=0a=0, we show the existence of non-radial minimizers for the Hardy-Sobolev critical exponent p(s)=p(Ns)Npp^* (s)=\frac{p (N-s)}{N-p} on bounded domains. Finally, we give remarks of a different structure between two nonlinear scalings which are equivalent to the usual scaling only for radial functions under some transformations.

Keywords

Cite

@article{arxiv.1908.03915,
  title  = {Minimization problem associated with an improved Hardy-Sobolev type inequality},
  author = {Megumi Sano},
  journal= {arXiv preprint arXiv:1908.03915},
  year   = {2020}
}

Comments

24 pages

R2 v1 2026-06-23T10:44:41.223Z