On weak-type (1,\,1) for averaging type operators

Abstract

It is known that, due to the fact that L1, ∞ is not a Banach space, if (Tj)j is a sequence of bounded operators so that Tj:L1 L1, ∞, with norm less than or equal to ||Tj|| and Σj ||Tj||<∞, nothing can be said about the operator T=Σj Tj. This is the origin of many difficult and open problems. However, if we assume that Tj:L1(u) L1, ∞(u), ∀ u∈ A1, with norm less than or equal to (||u||A1)||Tj||, where is a nondecreasing function and A1 the Muckenhoupt class of weights, then we prove that, essentially, T:L1(u) L1, ∞(u), ∀ u∈ A1. We shall see that this is the case of many interesting problems in Harmonic Analysis.