English

Pseudodifferential Operators on Variable Lebesgue Spaces

Functional Analysis 2011-10-04 v1

Abstract

Let M(Rn)\mathcal{M}(\mathbb{R}^n) be the class of bounded away from one and infinity functions p:Rn[1,]p:\mathbb{R}^n\to[1,\infty] such that the Hardy-Littlewood maximal operator is bounded on the variable Lebesgue space Lp()(Rn)L^{p(\cdot)}(\mathbb{R}^n). We show that if aa belongs to the H\"ormander class Sρ,δn(ρ1)S_{\rho,\delta}^{n(\rho-1)} with 0<ρ10<\rho\le 1, 0δ<10\le\delta<1, then the pseudodifferential operator \Op(a)\Op(a) is bounded on the variable Lebesgue space Lp()(Rn)L^{p(\cdot)}(\R^n) provided that p\cM(Rn)p\in\cM(\R^n). Let M(Rn)\mathcal{M}^*(\mathbb{R}^n) be the class of variable exponents pM(Rn)p\in\mathcal{M}(\mathbb{R}^n) represented as 1/p(x)=θ/p0+(1θ)/p1(x)1/p(x)=\theta/p_0+(1-\theta)/p_1(x) where p0(1,)p_0\in(1,\infty), θ(0,1)\theta\in(0,1), and p1M(Rn)p_1\in\mathcal{M}(\mathbb{R}^n). We prove that if aS1,00a\in S_{1,0}^0 slowly oscillates at infinity in the first variable, then the condition limRinfx+ξRa(x,ξ)>0 \lim_{R\to\infty}\inf_{|x|+|\xi|\ge R}|a(x,\xi)|>0 is sufficient for the Fredholmness of \Op(a)\Op(a) on Lp()(Rn)L^{p(\cdot)}(\R^n) whenever p\cM(Rn)p\in\cM^*(\R^n). Both theorems generalize pioneering results by Rabinovich and Samko \cite{RS08} obtained for globally log-H\"older continuous exponents pp, constituting a proper subset of M(Rn)\mathcal{M}^*(\mathbb{R}^n).

Keywords

Cite

@article{arxiv.1110.0297,
  title  = {Pseudodifferential Operators on Variable Lebesgue Spaces},
  author = {Alexei Yu. Karlovich and Ilya M. Spitkovsky},
  journal= {arXiv preprint arXiv:1110.0297},
  year   = {2011}
}

Comments

10 pages

R2 v1 2026-06-21T19:14:04.858Z