English

Traces for fractional Sobolev spaces with variable exponents

Analysis of PDEs 2017-09-25 v1

Abstract

In this note we prove a trace theorem in fractional spaces with variable exponents. To be more precise, we show that if p ⁣:Ω×Ω(1,)p\colon\overline{\Omega}\times \overline{\Omega}\to (1,\infty) and q:Ω(1,)q:\partial \Omega \rightarrow (1,\infty) are continuous functions such that (n1)p(x,x)nsp(x,x)>q(x)\mboxinΩ{xΩ ⁣:nsp(x,x)>0}, \frac{(n-1)p(x,x)}{n-sp(x,x)}>q(x) \qquad \mbox{in} \partial \Omega \cap \{x\in\overline{\Omega}\colon n-sp(x,x) >0\}, then the inequality fLq()(Ω)C{fLpˉ()(Ω)+[f]s,p(,)} \Vert f\Vert _{\scriptstyle L^{q(\cdot)}(\partial \Omega)} \leq C \left\{\Vert f\Vert _{\scriptstyle L^{\bar{p}(\cdot)}(\Omega)}+ [f]_{s,p(\cdot,\cdot)} \right\} holds. Here pˉ(x)=p(x,x)\bar{p}(x)=p(x,x) and [f]s,p(,)\lbrack f\rbrack_{s,p(\cdot,\cdot)} denotes the fractional seminorm with variable exponent, that is given by [f]s,p(,):=inf{λ>0 ⁣:ΩΩf(x)f(y)p(x,y)λp(x,y)xyn+sp(x,y)dxdy<1} \lbrack f\rbrack_{s,p(\cdot,\cdot)} := \inf \left\{\lambda >0\colon \int_{\Omega}\int_{\Omega}\frac{|f(x)-f(y)|^{p(x,y)}}{\lambda ^{p(x,y)} |x-y|^{n+sp(x,y)}}dxdy<1\right\} and fLq()(Ω)\Vert f\Vert _{\scriptstyle L^{q(\cdot)}(\partial \Omega)} and fLpˉ()(Ω)\Vert f\Vert _{\scriptstyle L^{\bar{p}(\cdot)}(\Omega)} are the usual Lebesgue norms with variable exponent.

Keywords

Cite

@article{arxiv.1704.02599,
  title  = {Traces for fractional Sobolev spaces with variable exponents},
  author = {Leandro M. Del Pezzo and Julio D. Rossi},
  journal= {arXiv preprint arXiv:1704.02599},
  year   = {2017}
}

Comments

10 pages

R2 v1 2026-06-22T19:12:07.355Z