A Family of Homogeneous Operators In The Cowen-Douglas Class Over The Poly-disc

Abstract

We construct a large family of positive-definite kernels K: Dn× Dn M (r, C), holomorphic in the first variable and anti-holomorphic in the second, that are quasi-invariant with respect to the subgroup M\"ob ×·s× M\"ob (n times) of the bi-holomorphic automorphism group of Dn. The adjoint of the n - tuples of multiplication operators by the co-ordinate functions on the Hilbert spaces HK determined by K is then homogeneous with respect to this subgroup. We show that these n - tuples are irreducible, are in the Cowen-Douglas class Br( Dn) and that they are mutually pairwise unitarily inequivalent.

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