Spectral asymptotic formula of Bessel--Riesz commutator
Abstract
Let Rλ,j be the j-th Bessel--Riesz transform, where n≥ 1, λ>0, and j=1,…,n+1. In this article, we establish a Weyl type asymptotic for [Mf,Rλ,j], the commutator of Rλ,j with multiplication operator Mf, based on building a preliminary result that the endpoint weak Schatten norm of [Mf,Rλ,j] can be characterised via homogeneous Sobolev norm W1,n+1(R+n+1) of the symbol f. Specifically, the asymptotic coefficient is equivalent to \|f\|W1,n+1(R+n+1). Our main strategy is to relate Bessel--Riesz commutator to classical Riesz commutator via Schur multipliers, and then to establish the boundedness of Schur multipliers.
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