Convolution operators of weak type (𝑝,𝑝) which are not of strong type (𝑝,𝑝)

Abstract

We give an example of a locally compact group G G for which, for every p p with 2 > p > ∞ 2 > p > \infty , there exists an operator of weak type ( p , p ) (p,p) commuting with the right translations on G G which is not of strong type ( p , p ) (p,p) . This gives a negative solution of E. M. Stein’s problem.