The quasi principal rank characteristic sequence
Abstract
A minor of a matrix is quasi-principal if it is a principal or an almost-principal minor. The quasi principal rank characteristic sequence (qpr-sequence) of an n× n symmetric matrix is introduced, which is defined as q1 q2 ·s qn, where qk is A, S, or N, according as all, some but not all, or none of its quasi-principal minors of order k are nonzero. This sequence extends the principal rank characteristic sequences in the literature, which only depend on the principal minors of the matrix. A necessary condition for the attainability of a qpr-sequence is established. Using probabilistic techniques, a complete characterization of the qpr-sequences that are attainable by symmetric matrices over fields of characteristic 0 is given.
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