A∞-invariance of oscillatory norms, and Schatten characterisations of commutators

Abstract

Schatten class properties of commutators [b,T] of pointwise multipliers b and singular integral operators T have been characterised in a variety of settings. An abstract framework, covering many of these results as special cases, was proposed by the author [arXiv:2411.02613]. However, recent results about commutators of the concrete Bessel-Riesz transforms by Fan-Li-Sukochev-Zanin [arXiv:2411.14928] are beyond this abstract setting. In this work, we present an extension of the framework of [arXiv:2411.02613], introducing two measures μ and that are A∞-equivalent to each other. The commutators act on a given space L2(μ), but the characterising function space norms of the multiplier b are taken with respect to another measure . In this way, assumptions like Ahlfors regularity and Poincar\'e inequality on the original measure μ may be relaxed, as long as there is an A∞-equivalent measure that satisfies these assumptions. In the Bessel example, the original μ fails to be Ahlfors regular, but is simply the Lebesgue measure. Within this framework, the Schatten norm characterisations of commutators of the Bessel-Riesz transforms at the critical-index by Fan-Li-Sukochev-Zanin [op cit.] are recovered by a completely different argument, replacing non-commutative techniques by real-variable harmonic analysis and hardly using any specifics of the Bessel setting. As a by-product, we also obtain a simpler characterisation in the non-critical case, replacing an ad-hoc Besov space of Fan-Lacey-Li-Xiong [J. Funct. Anal. 2026] by a classical Besov space.