Weak type operator Lipschitz and commutator estimates for commuting tuples

Abstract

Let f: Rd be a Lipschitz function. If B is a bounded self-adjoint operator and if \Ak\k=1d are commuting bounded self-adjoint operators such that [Ak,B]∈ L1(H), then \|[f(A1,·s,Ad),B]\|1,∞≤ c(d)\|∇(f)\|∞1≤ k≤ d\|[Ak,B]\|1, where c(d) is a constant independent of f, M and A,B and \|·\|1,∞ denotes the weak L1-norm. If \Xk\k=1d (respectively, \Yk\k=1d) are commuting bounded self-adjoint operators such that Xk-Yk∈ L1(H), then \|f(X1,·s,Xd)-f(Y1,·s,Yd)\|1,∞≤ c(d)\|∇(f)\|∞1≤ k≤ d\|Xk-Yk\|1.