AbstractIt is known that for every real square matrix A there exists a nonsingular real symmetric matrix S such thatSA=A′S,where A′ denotes the transpose of A.Using the notion of an M-matrix we derive a criterion for A to satisfy the above equality with a diagonal S of signature k. Such a matrix A will be called Dk-symmetrizable and the paper presents some results on this concept. In particular we show that a Dk-symmetrizable matrix shares many properties with a real symmetric matrix and that any real matrix A, up to an orthogonal similarity, is Dk-symmetrizable for some k
AbstractThis paper deals with idempotent matrices (i.e., A2=A) and t-potent matrices (i.e., Bt=B). W...
AbstractWe completely describe the determinants of the sum of orbits of two real skew symmetric matr...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
AbstractWe present explicit formulae which allow us to construct elliptic matrices with zero diagona...
AbstractThe inverse eigenvalue problem for real symmetric matrices of the form000⋯00∗000⋯0∗∗000⋯∗∗0·...
AbstractThe problem of determining necessary and sufficient conditions for a set of real numbers to ...
AbstractWe say that a matrix R∈Cn×n is k-involutory if its minimal polynomial is xk-1 for some k⩾2, ...
AbstractLet T be an unweighted tree of k levels such that in each level the vertices have equal degr...
AbstractLet V be a linear subspace of real matrices such that each matrix A∈V is similar to a symmet...
AbstractLet A be a real strictly diagonally dominant M-matrix. We give a sharp upper bound for A-1∞....
AbstractSuppose that one knows an accurate approximation to an eigenvalue of a real symmetric tridia...
AbstractAn involutory upper triangular Pascal matrix Un is investigated. Eigenvectors of Un and of U...
AbstractFor any p>1 and for any sequence $\{ a_j \}^\infty_{j=1}$ of nonnegative numbers, a classica...
AbstractWe consider lower bounds for the largest eigenvalue of a symmetric matrix. In particular we ...
AbstractMirsky proved that, for the existence of a complex matrix with given eigenvalues and diagona...
AbstractThis paper deals with idempotent matrices (i.e., A2=A) and t-potent matrices (i.e., Bt=B). W...
AbstractWe completely describe the determinants of the sum of orbits of two real skew symmetric matr...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
AbstractWe present explicit formulae which allow us to construct elliptic matrices with zero diagona...
AbstractThe inverse eigenvalue problem for real symmetric matrices of the form000⋯00∗000⋯0∗∗000⋯∗∗0·...
AbstractThe problem of determining necessary and sufficient conditions for a set of real numbers to ...
AbstractWe say that a matrix R∈Cn×n is k-involutory if its minimal polynomial is xk-1 for some k⩾2, ...
AbstractLet T be an unweighted tree of k levels such that in each level the vertices have equal degr...
AbstractLet V be a linear subspace of real matrices such that each matrix A∈V is similar to a symmet...
AbstractLet A be a real strictly diagonally dominant M-matrix. We give a sharp upper bound for A-1∞....
AbstractSuppose that one knows an accurate approximation to an eigenvalue of a real symmetric tridia...
AbstractAn involutory upper triangular Pascal matrix Un is investigated. Eigenvectors of Un and of U...
AbstractFor any p>1 and for any sequence $\{ a_j \}^\infty_{j=1}$ of nonnegative numbers, a classica...
AbstractWe consider lower bounds for the largest eigenvalue of a symmetric matrix. In particular we ...
AbstractMirsky proved that, for the existence of a complex matrix with given eigenvalues and diagona...
AbstractThis paper deals with idempotent matrices (i.e., A2=A) and t-potent matrices (i.e., Bt=B). W...
AbstractWe completely describe the determinants of the sum of orbits of two real skew symmetric matr...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...