Marcinkiewicz multipliers associated with the Kohn Laplacian on the Shilov boundary of the product domain in C 2n

Abstract

Let M(k), k=1,2,…, n, be the boundary of an unbounded polynomial domain (k) of finite type in C 2, and let b(k) be the Kohn Laplacian on M(k). In this paper, we study multivariable spectral multipliers m(b(1),…, b(n)) acting on the Shilov boundary M=M(1) ×·s× M(n) of the product domain (1)×·s× (n). We show that if a function F(λ1, … ,λn) satisfies a Marcinkiewicz-type differential condition, then the spectral multiplier operator m(b(1), …, b(n)) is a product Calder\'on--Zygmund operator of Journ\'e type.