Asymptotic behavior of extremals for fractional Sobolev inequalities associated with singular problems

Abstract: Let $\Omega$ be a smooth, bounded domain of $\mathbb{R}^{N}$, $\omega$ be a positive, $L^{1}$-normalized function, and $0<s<1<p.$ We study the asymptotic behavior, as $p\rightarrow\infty,$ of the pair $\left( \sqrt[p]{\Lambda_{p}% },u_{p}\right) ,$ where $\Lambda_{p}$ is the best constant $C$ in the Sobolev type inequality [ C\exp\left( \int_{\Omega}(\log\left\vert u\right\vert ^{p})\omega \mathrm{d}x\right) \leq\left[ u\right] {s,p}^{p}\quad\forall\,u\in W{0}^{s,p}(\Omega) ] and $u_{p}$ is the positive, suitably normalized extremal function corresponding to $\Lambda_{p}$. We show that the limit pairs are closely related to the problem of minimizing the quotient $\left\vert u\right\vert {s}/\exp\left( \int{\Omega}(\log\left\vert u\right\vert )\omega \mathrm{d}x\right) ,$ where $\left\vert u\right\vert {s}$ denotes the $s$-H\"{o}lder seminorm of a function $u\in C{0}^{0,s}(\overline{\Omega}).$