AbstractThe inequality per(A∘B)⩽ perA perB is verified for nonnegative 2×2 and 3×3 Hermitian matrices, where A∘B is the Hadamard product ofA and B
AbstractDrew and Johnson obtained an expression for max{per A}, where A runs through all 3-by-3 real...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
This paper is concerned with the conjecture on the permanent of the Hadamard product of two positive...
AbstractThe inequality per(A∘B)⩽ perA perB is verified for nonnegative 2×2 and 3×3 Hermitian matrice...
AbstractIt is shown in an elementary way that if A and B are positive semidefinite matrices, then pe...
International audienceWe study the classical Hermite-Hadamard inequality in the matrix setting. This...
We recall Vere-Jones's definition of the $alpha$--permanent and describe the connection between the ...
AbstractLet M denote an n × n positive semidefinite Hermitian matrix,and let W = [ωij] be either a 2...
In this paper the author proves some equalities about the permanent of matrices under some condition...
An elementary proof of the permanental Hadamard inequality is given. Some stronger inequalities are ...
Abstract. Recently, the authors established a number of inequalities involving integer powers of the...
AbstractWhen A∈Rn×n is an M-matrix we prove the following inequality:q(A∘A−1)=1forn=2,>2nforn>2,wher...
AbstractLet A be a fully indecomposable, nonnegative matrix of order n with row sums rl,rn, and let ...
AbstractA typical result given in this paper is as follows: For an N X N positive definite Hermitian...
AbstractA recent conjecture of Caputo, Carlen, Lieb, and Loss, and, independently, of the author, st...
AbstractDrew and Johnson obtained an expression for max{per A}, where A runs through all 3-by-3 real...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
This paper is concerned with the conjecture on the permanent of the Hadamard product of two positive...
AbstractThe inequality per(A∘B)⩽ perA perB is verified for nonnegative 2×2 and 3×3 Hermitian matrice...
AbstractIt is shown in an elementary way that if A and B are positive semidefinite matrices, then pe...
International audienceWe study the classical Hermite-Hadamard inequality in the matrix setting. This...
We recall Vere-Jones's definition of the $alpha$--permanent and describe the connection between the ...
AbstractLet M denote an n × n positive semidefinite Hermitian matrix,and let W = [ωij] be either a 2...
In this paper the author proves some equalities about the permanent of matrices under some condition...
An elementary proof of the permanental Hadamard inequality is given. Some stronger inequalities are ...
Abstract. Recently, the authors established a number of inequalities involving integer powers of the...
AbstractWhen A∈Rn×n is an M-matrix we prove the following inequality:q(A∘A−1)=1forn=2,>2nforn>2,wher...
AbstractLet A be a fully indecomposable, nonnegative matrix of order n with row sums rl,rn, and let ...
AbstractA typical result given in this paper is as follows: For an N X N positive definite Hermitian...
AbstractA recent conjecture of Caputo, Carlen, Lieb, and Loss, and, independently, of the author, st...
AbstractDrew and Johnson obtained an expression for max{per A}, where A runs through all 3-by-3 real...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
This paper is concerned with the conjecture on the permanent of the Hadamard product of two positive...