On the dimension of the locus of determinantal hypersurfaces

Abstract

The characteristic polynomial of an r-tuple (A1,..., Ar) of n × n matrices is the determinant (x0 I + x1 A1 + ... + xr Ar). We show that if r is at least 3 and A = (A1,..., Ar) is an r-tuple of matrices in general position, then up to conjugacy there are only finitely many r-tuples of matrices with the same characteristic polynomial as A. Equivalently, the locus of determinantal hypersurfaces of degree n in Pr is irreducible of dimension (r-1)n2 + 1.