Ideals of Spaces of Degenerate Matrices
Abstract
The variety Singn, m consists of all tuples X = (X1,…, Xm) of n× n matrices such that every linear combination of X1,…, Xm is singular. Equivalently, X∈Singn,m if and only if (λ1 X1 + … + λm Xm) = 0 for all λ1,…, λm∈ Q . Makam and Wigderson asked whether the ideal generated by these equations is always radical, that is, if any polynomial identity that is valid on Singn, m lies in the ideal generated by the polynomials (λ1 X1 + … + λm Xm). We answer this question in the negative by determining the vanishing ideal of Sing2, m for all m∈ N . Our results exhibit that there are additional equations arising from the tensor structure of X . More generally, for any n and m n2 - n + 1 , we prove there are equations vanishing on Singn, m that are not in the ideal generated by polynomials of type (λ1 X1 + … + λm Xm). Our methods are based on classical results about Fano schemes, representation theory and Gr\"obner bases.
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