AbstractThe notion of Bezoutian of nonsquare matrix polynomials is defined. It is used to establish formulae for the inverse of square matrices partitioned into nonsquare blocks. In particular, a generalization of the Gohberg-Semencul formula for the inverse of a generalized Toeplitz matrix is proved
AbstractInverses of Toeplitz-plus-Hankel matrices and, more generally, T+H-Bezoutians are represente...
AbstractIt is well known that the inverses of Hankel and Toeplitz matrices can be represented as Bez...
AbstractRelations of Bezoutians of polynomial matrices with truncated block Hankel matrices are disc...
AbstractThe notion of Bezoutian of nonsquare matrix polynomials is defined. It is used to establish ...
AbstractThe Bezoutian B of a quadruple (F, G; U, D) of polynomial matrices is studied. It is shown t...
AbstractAn approach is presented to get matrix representations for classical and more general r-Bezo...
AbstractA natural generalization of the classical Bezout matrix of two polynomials is introduced for...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
We give a self-contained proof that the nullity of the Bezoutian matrix associated with a pair of po...
AbstractInverses of symmetric (or skewsymmetric) Toeplitz matrices as well as of centrosymmetric (or...
AbstractThe following commutator identity is proved:[u(S∗), v(S)] = [v1(S∗), u1(S)]. Here S is the n...
AbstractHankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respe...
AbstractThe Bézoutian B of two polynomial matrices can be described as a solution of a linear matrix...
AbstractConditions for inverting H-Bezoutians of nonsquare matrix polynomials are studied. Necessary...
AbstractA generalization of companion matrices is presented as the starting point for developing a u...
AbstractInverses of Toeplitz-plus-Hankel matrices and, more generally, T+H-Bezoutians are represente...
AbstractIt is well known that the inverses of Hankel and Toeplitz matrices can be represented as Bez...
AbstractRelations of Bezoutians of polynomial matrices with truncated block Hankel matrices are disc...
AbstractThe notion of Bezoutian of nonsquare matrix polynomials is defined. It is used to establish ...
AbstractThe Bezoutian B of a quadruple (F, G; U, D) of polynomial matrices is studied. It is shown t...
AbstractAn approach is presented to get matrix representations for classical and more general r-Bezo...
AbstractA natural generalization of the classical Bezout matrix of two polynomials is introduced for...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
We give a self-contained proof that the nullity of the Bezoutian matrix associated with a pair of po...
AbstractInverses of symmetric (or skewsymmetric) Toeplitz matrices as well as of centrosymmetric (or...
AbstractThe following commutator identity is proved:[u(S∗), v(S)] = [v1(S∗), u1(S)]. Here S is the n...
AbstractHankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respe...
AbstractThe Bézoutian B of two polynomial matrices can be described as a solution of a linear matrix...
AbstractConditions for inverting H-Bezoutians of nonsquare matrix polynomials are studied. Necessary...
AbstractA generalization of companion matrices is presented as the starting point for developing a u...
AbstractInverses of Toeplitz-plus-Hankel matrices and, more generally, T+H-Bezoutians are represente...
AbstractIt is well known that the inverses of Hankel and Toeplitz matrices can be represented as Bez...
AbstractRelations of Bezoutians of polynomial matrices with truncated block Hankel matrices are disc...