Lipschitz estimates in quasi-Banach Schatten ideals

Abstract

We study the class of functions f on R satisfying a Lipschitz estimate in the Schatten ideal Lp for 0 < p ≤ 1. The corresponding problem with p≥ 1 has been extensively studied, but the quasi-Banach range 0 < p < 1 is by comparison poorly understood. Using techniques from wavelet analysis, we prove that Lipschitz functions belonging to the homogeneous Besov class B1pp1-p,p(R) obey the estimate \|f(A)-f(B)\|p ≤ Cp(\|f'\|L∞(R)+\|f\|B1pp1-p,p(R))\|A-B\|p for all bounded self-adjoint operators A and B with A-B∈ Lp. In the case p=1, our methods recover and provide a new perspective on a result of Peller that f ∈ B1∞,1 is sufficient for a function to be Lipschitz in L1. We also provide related H\"older-type estimates, extending results of Aleksandrov and Peller. In addition, we prove the surprising fact that non-constant periodic functions on R are not Lipschitz in Lp for any 0 < p < 1. This gives counterexamples to a 1991 conjecture of Peller that f ∈ B1/p∞,p(R) is sufficient for f to be Lipschitz in Lp.