Determinantal Varieties Over Truncated Polynomial Rings
Abstract
We study higher order determinantal varieties obtained by considering generic () matrices over rings of the form , and for some fixed , setting the coefficients of powers of of all minors to zero. These varieties can be interpreted as generalized tangent bundles over the classical determinantal varieties; a special case of these varieties first appeared in a problem in commuting matrices. We show that when , the varieties are irreducible, but when , these varieties have at least components. In fact, when (for any ), or when (for any ), there are exactly components. We give formulas for the dimensions of these components in terms of , , and . In the case of square matrices with , we show that the ideals of our varieties are prime and that the coordinate rings are complete intersection rings, and we compute the degree of our varieties via the combinatorics of a suitable simplicial complex.
Cite
@article{arxiv.math/0212051,
title = {Determinantal Varieties Over Truncated Polynomial Rings},
author = {Tomaz Kosir and B. A. Sethuraman},
journal= {arXiv preprint arXiv:math/0212051},
year = {2007}
}
Comments
29 pages, 1 figure