Homogeneous Hermitian Holomorphic Vector Bundles And Operators In The Cowen-Douglas Class Over The Poly-disc

Abstract

In this article, we obtain two sets of results. The first set of complete results are exclusively for the case of the bi-disc while the second set of results describe in part, which of these carry over to the general case of the poly-disc: * A classification of irreducible hermitian holomorphic vector bundles over D2, homogeneous with respect to M\"ob× M\"ob, is obtained assuming that the associated representations are multiplicity-free. Among these the ones that give rise to an operator in the Cowen-Douglas class of D2 of rank 1,2 or 3 is determined. * Any hermitian holomorphic vector bundle of rank 2 over Dn, homogeneous with respect to the n-fold product of the group M\"ob is shown to be a tensor product of n-1 hermitian holomorphic line bundles, each of which is homogeneous with respect to M\"ob and a hermitian holomorphic vector bundle of rank 2, homogeneous with respect to M\"ob. * The classification of irreducible homogeneous hermitian holomorphic vector buldles over D2 of rank 3 (as well as the corresponding Cowen-Douglas class of operators) is extended to the case of Dn, n>2. * It is shown that there is no irreducible n - tuple of operators in the Cowen-Douglas class B2(Dn) that is homogeneous with respect Aut(Dn), n >1. Also, pairs of operators in B3(D2) homogeneous with respect to Aut(D2) are produced, while it is shown that no n - tuple of operators in B3(Dn) is homogeneous with respect to Aut(Dn), n > 2.