AbstractThe König-Egerváry theorem, which asserts that the maximum size of a partial matching in a relation equals the minimum size of a separating set, is proved using Jacobi's identity relating complementary minors in a matrix and its adjugate
AbstractThe Green's function method used by Case and Kac is extended to include unbounded Jacobi mat...
AbstractA function f with simple and nice algebraic properties is defined on a subset of the space o...
AbstractLet χ be a character of the symmetric group Ln. The immanant of an n × n matrix A = [aij] wi...
AbstractIt is shown that a n×n Jacobi matrix is uniquely determined by its n eigenvalues and by the ...
AbstractWe give a combinatorial proof of Jacobi's equality relating a cofactor of a matrix with the ...
AbstractA proof is given for the existence and uniqueness of a correspondence between two pairs of s...
AbstractThe paper refers to the well-known identity, published by Jacobi in 1833, relating each mino...
AbstractKönig's theorem asserts that the minimal number of lines (i.e., rows or columns) which conta...
Contents. 1.Introduction and Notation; 2.A Jacobian Criterion for Separability; 3.A Jacobian Criteri...
AbstractLet L be a linear map on the space of n by n matrices with entries in an algebraically close...
The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron def...
AbstractWe prove a conjecture on characters of Sn which implies another conjecture (both due to Goul...
AbstractA new principle for extending determinantal identities is established which generalizes Muir...
AbstractColumns of a matrix A in the minimax algebra are called strongly linearly independent if for...
AbstractThis paper gives new proofs for certain inequalities previously established by the author in...
AbstractThe Green's function method used by Case and Kac is extended to include unbounded Jacobi mat...
AbstractA function f with simple and nice algebraic properties is defined on a subset of the space o...
AbstractLet χ be a character of the symmetric group Ln. The immanant of an n × n matrix A = [aij] wi...
AbstractIt is shown that a n×n Jacobi matrix is uniquely determined by its n eigenvalues and by the ...
AbstractWe give a combinatorial proof of Jacobi's equality relating a cofactor of a matrix with the ...
AbstractA proof is given for the existence and uniqueness of a correspondence between two pairs of s...
AbstractThe paper refers to the well-known identity, published by Jacobi in 1833, relating each mino...
AbstractKönig's theorem asserts that the minimal number of lines (i.e., rows or columns) which conta...
Contents. 1.Introduction and Notation; 2.A Jacobian Criterion for Separability; 3.A Jacobian Criteri...
AbstractLet L be a linear map on the space of n by n matrices with entries in an algebraically close...
The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron def...
AbstractWe prove a conjecture on characters of Sn which implies another conjecture (both due to Goul...
AbstractA new principle for extending determinantal identities is established which generalizes Muir...
AbstractColumns of a matrix A in the minimax algebra are called strongly linearly independent if for...
AbstractThis paper gives new proofs for certain inequalities previously established by the author in...
AbstractThe Green's function method used by Case and Kac is extended to include unbounded Jacobi mat...
AbstractA function f with simple and nice algebraic properties is defined on a subset of the space o...
AbstractLet χ be a character of the symmetric group Ln. The immanant of an n × n matrix A = [aij] wi...