Matrix polynomials, generalized Jacobians, and graphical zonotopes
Abstract
A matrix polynomial is a polynomial in a complex variable with coefficients in complex matrices. The spectral curve of a matrix polynomial is the curve . The set of matrix polynomials with a given spectral curve is known to be closely related to the Jacobian of , provided that is smooth. We extend this result to the case when is an arbitrary nodal, possibly reducible, curve. In the latter case the set of matrix polynomials with spectral curve turns out to be naturally stratified into smooth pieces, each one being an open subset in a certain generalized Jacobian. We give a description of this stratification in terms of purely combinatorial data and describe the adjacency of strata. We also make a conjecture on the relation between completely reducible matrix polynomials and the canonical compactified Jacobian defined by V.Alexeev.
Cite
@article{arxiv.1506.05179,
title = {Matrix polynomials, generalized Jacobians, and graphical zonotopes},
author = {Anton Izosimov},
journal= {arXiv preprint arXiv:1506.05179},
year = {2015}
}
Comments
19 pages, 7 figures