Endpoint estimates for commutators of singular integrals related to Schr\"odinger operators

Abstract

Let L= -+ V be a Schr\"odinger operator on Rd, d≥ 3, where V is a nonnegative potential, V 0, and belongs to the reverse H\"older class RHd/2. In this paper, we study the commutators [b,T] for T in a class KL of sublinear operators containing the fundamental operators in harmonic analysis related to L. More precisely, when T∈ KL, we prove that there exists a bounded subbilinear operator R= RT: H1L( Rd)× BMO( Rd) L1( Rd) such that |T( S(f,b))|- R(f,b)≤ |[b,T](f)|≤ R(f,b) + |T( S(f,b))|, where S is a bounded bilinear operator from H1L( Rd)× BMO( Rd) into L1( Rd) which does not depend on T. The subbilinear decomposition (abstract 1) explains why commutators with the fundamental operators are of weak type (H1L,L1), and when a commutator [b,T] is of strong type (H1L,L1). Also, we discuss the H1L-estimates for commutators of the Riesz transforms associated with the Schr\"odinger operator L.