Feedback invariants of matrix quadruple completions

The challenge consists in describing the relationships between the Kronecker invariants of a matrix pencil and one of its subpencils. For a given subpencil, an algorithm for constructing a matrix pencil with prescribed Kronecker invariants should also be proposed.

A list of positions in an n x n real matrix (a pattern) is said to have M-completion if every partial M-matrix that specifies exactly these positions can be completed to an Mmatrix. Let Q be a pattern that includes all diagonal entries and let G be its digraph. The following are equivalent. (1) the

A list of positions in an i1 x n real matrix that includes all diagonal positions (a pattern) is said to have inverse M-completion if every partial inverse M-matrix that specifies exactly these positions can be completed to an inverse M-matrix. Johnson and Smith (C.R. Johnson, R.L. Smith, Linear Alg

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