Pseudodifferential Operators on Variable Lebesgue Spaces

Abstract

Let M(Rn) be the class of bounded away from one and infinity functions p:Rn[1,∞] such that the Hardy-Littlewood maximal operator is bounded on the variable Lebesgue space Lp(·)(Rn). We show that if a belongs to the H\"ormander class S,δn(-1) with 0< 1, 0δ<1, then the pseudodifferential operator (a) is bounded on the variable Lebesgue space Lp(·)(n) provided that p∈(n). Let M*(Rn) be the class of variable exponents p∈M(Rn) represented as 1/p(x)=θ/p0+(1-θ)/p1(x) where p0∈(1,∞), θ∈(0,1), and p1∈M(Rn). We prove that if a∈ S1,00 slowly oscillates at infinity in the first variable, then the condition \[ R∞∈f|x|+|| R|a(x,)|>0 \] is sufficient for the Fredholmness of (a) on Lp(·)(n) whenever p∈*(n). Both theorems generalize pioneering results by Rabinovich and Samko RS08 obtained for globally log-H\"older continuous exponents p, constituting a proper subset of M*(Rn).