The local Tb theorem with rough test functions

Abstract

We prove a local Tb theorem under close to minimal (up to certain `buffering') integrability assumptions, conjectured by S. Hofmann (El Escorial, 2008): Every cube is assumed to support two non-degenerate functions b1Q∈ Lp and b2Q∈ Lq such that 12QTb1Q∈ Lq' and 12QT*b2Q∈ Lp', with appropriate uniformity and scaling of the norms. This is sufficient for the L2-boundedness of the Calderon-Zygmund operator T, for any p,q∈(1,∞), a result previously unknown for simultaneously small values of p and q. We obtain this as a corollary of a local Tb theorem for the maximal truncations T\# and (T*)\#: for the L2-boundedness of T, it suffices that 1Q T\#b1Q and 1Q (T*)\#b2Q be uniformly in L0. The proof builds on the technique of suppressed operators from the quantitative Vitushkin conjecture due to Nazarov-Treil-Volberg.