Franke-Jawerth embeddings for Besov and Triebel-Lizorkin spaces with variable exponents

Abstract

The classical Jawerth and Franke embeddings Fs0p0,q( Rn) Bs1p1,p0( Rn) and Bs0p0,p1( Rn) Fs1p1,q( Rn) are versions of Sobolev embedding between the scales of Besov and Triebel-Lizorkin function spaces for s0>s1 and s0-np0 = s1-np1. We prove Jawerth and Franke embeddings for the scales of Besov and Triebel-Lizorkin spaces with all exponents variable Fs0(·)p0(·),q(·) Bs1(·)p1(·),p0(·) and Bs0(·)p0(·),p1(·) Fs1(·)p1(·),q(·), respectively, if ∈fx∈Rn(s0(x)-s1(x))>0 and s0(x) -np0(x) = s1(x) -np1(x), x ∈ Rn. We work exclusively with the associated sequence spaces bs(·)p(·),q(·) and fs(·)p(·),q(·), which is justified by well known decomposition techniques. We give also a different proof of the Franke embedding in the constant exponent case which avoids duality arguments and interpolation. Our results hold also for 2-microlocal function spaces Bwp(·),q(·)( Rn) and Fwp(·),q(·)( Rn) which unify the smoothness scales of spaces of variable smoothness and generalized smoothness spaces.