Generic symmetric matrix pencils with bounded rank
Abstract
We show that the set of n × n complex symmetric matrix pencils of rank at most r is the union of the closures of r/2 +1 sets of matrix pencils with some, explicitly described, complete eigenstructures. As a consequence, these are the generic complete eigenstructures of n × n complex symmetric matrix pencils of rank at most r. We also show that these closures correspond to the irreducible components of the set of n× n symmetric matrix pencils with rank at most r when considered as an algebraic set.
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