The Lp-to-Lq Compactness of Commutators with p>q

Abstract

Let 1<q<p<∞, 1r:=1q-1p, and T be a non-degenerate Calder\'on--Zygmund operator. We show that the commutator [b,T] is compact from Lp( Rn) to Lq( Rn) if and only if the symbol b=a+c with a∈ Lr( Rn) and c being any constant. Since both the corresponding Hardy--Littlewood maximal operator and the corresponding Calder\'on--Zygmund maximal operator are not bounded from Lp( Rn) to Lq( Rn), we take the full advantage of the compact support of the approximation element in C c∞( Rn), which seems to be redundant for many corresponding estimates when p≤ q but to be crucial when p>q. We also extend the results to the multilinear case.