Determinantal Varieties Over Truncated Polynomial Rings
Abstract
We study higher order determinantal varieties obtained by considering generic m× n (m n) matrices over rings of the form F[t]/(tk), and for some fixed r, setting the coefficients of powers of t of all r × r 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 r = m, the varieties are irreducible, but when r < m, these varieties have at least k/2 + 1 components. In fact, when r=2 (for any k), or when k=2 (for any r), there are exactly k/2 + 1 components. We give formulas for the dimensions of these components in terms of k, m, and n. In the case of square matrices with r=m, 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.
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