Fundamental properties of Cauchy--Szego projection on quaternionic Siegel upper half space and applications

Abstract

We investigate the Cauchy--Szego projection for quaternionic Siegel upper half space to obtain the pointwise (higher order) regularity estimates for Cauchy--Szego kernel and prove that the Cauchy--Szego kernel is non-zero everywhere, which further yields a non-degenerated pointwise lower bound. As applications, we prove the uniform boundedness of Cauchy--Szego projection on every atom on the quaternionic Heisenberg group, which is used to give an atomic decomposition of regular Hardy space Hp on quaternionic Siegel upper half space for 2/3<p≤1. Moreover, we establish the characterisation of singular values of the commutator of Cauchy--Szego projection based on the kernel estimates and on the recent new approach by Fan--Lacey--Li. The quaternionic structure (lack of commutativity) is encoded in the symmetry groups of regular functions and the associated partial differential equations.

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