The relationship of the Gaussian curvature with the curvature of a   Cowen-Douglas operator

Soumitra Ghara; Gadadhar Misra

arXiv:2202.02402·math.FA·February 8, 2022

The relationship of the Gaussian curvature with the curvature of a Cowen-Douglas operator

Soumitra Ghara, Gadadhar Misra

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TL;DR

This paper explores the connection between Gaussian curvature and the curvature of Cowen-Douglas operators, providing new inequalities and relationships in operator theory and complex geometry.

Contribution

It introduces a strengthened curvature inequality for Cowen-Douglas class operators and relates reproducing kernels to curvature of quotient modules.

Findings

01

Strengthened curvature inequality for $B_1(\

02

Relationship between reproducing kernels and curvature of quotient modules

Abstract

It has been recently shown that if $K$ is a sesqui-analytic scalar valued non-negative definite kernel on a domain $Ω$ in $C^{m}$ , then the function $(K^{2} \partial_{i} \overset{ˉ}{\partial}_{j} lo g K)_{i, j = 1}^{m},$ is also a non-negative definite kernel on $Ω$ . In this paper, we discuss two consequences of this result. The first one strengthens the curvature inequality for operators in the Cowen-Douglas class $B_{1} (Ω)$ while the second one gives a relationship of the reproducing kernel of a submodule of certain Hilbert modules with the curvature of the associated quotient module.

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Taxonomy

TopicsHolomorphic and Operator Theory · Geometric Analysis and Curvature Flows · Advanced Operator Algebra Research