Möb Homogeneous Analytic Hilbert Modules over the Bidisc
Abstract
An analytic Hilbert module H over the polynomial ring, consisting of holomorphic functions over the bidisc, is said to be Möb-homogeneous if the corresponding pair of multiplication operators is homogeneous with respect to the diagonal action of the group \(φ,φ): φ∈ Möb\ Möb. In this article, we construct three families of mutually unitarily inequivalent Möb-homogeneous analytic Hilbert modules, distinct from the family of weighted Bergman modules over the bidisc. We further show that none of the reproducing kernels in one of these families induces a Kähler--Einstein metric on the bidisc.
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