The generic canonical form for of matrices
Abstract
First, we prove that the set of n× n complex matrices is the closure of a certain open subset whose elements have a very specific canonical form under congruence, which is uniquely determined up to the values of some parameters, but which has a slightly different expression depending on whether n is even or odd. As a consequence, the canonical form under congruence of the elements of this subset can be considered the generic canonical form under congruence of complex n× n matrices. Second, we prove that the set of n× n complex matrices is the union of the closures of certain n/2+1 open subsets and that, for each of these subsets, its elements have a very specific canonical form under *congruence, which is uniquely determined up to the values of some parameters. As a consequence, the n/2+1 canonical forms under *congruence of the elements of each of these subsets can be considered the generic canonical forms under *congruence of complex n× n matrices. So, there is only one generic canonical form under congruence whereas the number of generic canonical forms under *congruence is n/2+1 instead, which reveals a strong dichotomy between the relations of congruence and *congruence with respect to generic structures. In other words, we determine in this paper the generic matrix representations of n× n bilinear and sesquilinear forms in Cn × Cn.
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