AbstractAlternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric and skew-symmetric matrices, generalize the notions of even and odd scalar polynomials. We investigate the Smith forms of alternating matrix polynomials, showing that each invariant factor is an even or odd scalar polynomial. Necessary and sufficient conditions are derived for a given Smith form to be that of an alternating matrix polynomial. These conditions allow a characterization of the possible Jordan structures of alternating matrix polynomials, and also lead to necessary and sufficient conditions for the existence of structure-preserving strong linearizations. Most of the results are applicable to singular as well as regular ma...
The notion of standard triples plays a central role in the theory of matrix polynomi-als. We study s...
We present a framework for the construction of linearizations for scalar and matrix polynomials base...
AbstractThe notion of standard triples plays a central role in the theory of matrix polynomials. We ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coecients alternate between symmetric and...
AbstractAlternating matrix polynomials, that is, polynomials whose coefficients alternate between sy...
We characterize the Smith form of skew-symmetric matrix polynomials over an arbi-trary field F, show...
We characterize the Smith form of skew-symmetric matrix polynomials over an arbitrary field $\F$, sh...
Many applications give rise to matrix polynomials whose coefficients have a kind of reversal symmetr...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
Abstract. In this paper we give strong linearizations of a matrix polynomial P (λ) preserving the sk...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
The notion of standard triples plays a central role in the theory of matrix polynomi-als. We study s...
We present a framework for the construction of linearizations for scalar and matrix polynomials base...
AbstractThe notion of standard triples plays a central role in the theory of matrix polynomials. We ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coefficients alternate between symmetric ...
Alternating matrix polynomials, that is, polynomials whose coecients alternate between symmetric and...
AbstractAlternating matrix polynomials, that is, polynomials whose coefficients alternate between sy...
We characterize the Smith form of skew-symmetric matrix polynomials over an arbi-trary field F, show...
We characterize the Smith form of skew-symmetric matrix polynomials over an arbitrary field $\F$, sh...
Many applications give rise to matrix polynomials whose coefficients have a kind of reversal symmetr...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
Abstract. In this paper we give strong linearizations of a matrix polynomial P (λ) preserving the sk...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
We develop a complete and rigorous theory of root polynomials of arbitrary matrix polynomials, i.e.,...
The notion of standard triples plays a central role in the theory of matrix polynomi-als. We study s...
We present a framework for the construction of linearizations for scalar and matrix polynomials base...
AbstractThe notion of standard triples plays a central role in the theory of matrix polynomials. We ...