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,∞) and q:∂Ω→(1,∞) are continuous functions such that n−sp(x,x)(n−1)p(x,x)>q(x)\mboxin∂Ω∩{x∈Ω:n−sp(x,x)>0}, then the inequality ∥f∥Lq(⋅)(∂Ω)≤C{∥f∥Lpˉ(⋅)(Ω)+[f]s,p(⋅,⋅)} holds. Here pˉ(x)=p(x,x) and [f]s,p(⋅,⋅) denotes the fractional seminorm with variable exponent, that is given by [f]s,p(⋅,⋅):=inf{λ>0:∫Ω∫Ωλp(x,y)∣x−y∣n+sp(x,y)∣f(x)−f(y)∣p(x,y)dxdy<1} and ∥f∥Lq(⋅)(∂Ω) and ∥f∥Lpˉ(⋅)(Ω) are the usual Lebesgue norms with variable exponent.
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