Holomorphic factorization of matrices of polynomials
Abstract
This paper considers some work done by the author and Catlin [CD1,CD2,CD3] concerning positivity conditions for bihomogeneous polynomials and metrics on bundles over certain complex manifolds. It presents a simpler proof of a special case of the main result in [CD3], providing also a self-contained proof of a generalization of the main result from [CD1]. Some new examples and applications appear here as well. The idea is to use the Bergman kernel function and some operator theory to prove purely algebraic theorems about matrices of polynomials. Theorem 1. [Catlin-D'Angelo]. Suppose that is a bihomogeneous real-valued polynomial on of degree . Then is positive away from the origin if and only there is an integer and a holomorphic homogeneous polynomial mapping , whose components span the space of homogeneous polynomials of degree , such that Suppose that is an by matrix whose entries are bihomogeneous polynomials of degree . Then is positive-definite at each point if and only if there is an integer and a holomorphic homogeneous polynomial matrix , whose row vectors span the space of -tuples of homogeneous polynomials of degree , such that
Cite
@article{arxiv.math/9708201,
title = {Holomorphic factorization of matrices of polynomials},
author = {John P. D'Angelo},
journal= {arXiv preprint arXiv:math/9708201},
year = {2016}
}