AbstractWe study the class of so-called totally dominant matrices in the usual algebra and in the max algebra in which the sum is the maximum and the multiplication is usual. It turns out that this class coincides with the well known class of positive matrices having positive the determinants of all 2×2 submatrices. The closure of this class is closed not only with respect to the usual but also with respect to the max multiplication. Further properties analogous to those of totally positive matrices are proved and some connections to Monge matrices are mentioned
AbstractIn this paper we study the maximal absolute values of determinants and subdeterminants of ±1...
AbstractLet P be the set of all n × n real matrices which have a positive determinant. We show here ...
AbstractThough total positivity appears in various branches of mathematics, it is rather unfamiliar ...
AbstractWe study the class of so-called totally dominant matrices in the usual algebra and in the ma...
AbstractA real matrix is called k-subtotally positive if the determinants of all its submatrices of ...
summary:A close relationship between the class of totally positive matrices and anti-Monge matrices ...
AbstractThis paper studies commuting matrices in max algebra and nonnegative linear algebra. Our sta...
AbstractWe present a table indicating whether or not each of five positivity classes of matrices (po...
This modern account of totally positive matrices treats their central properties with full proofs an...
In this work, we introduce the class of P 1 max -matrices for the max algebraandderivesomeprope...
AbstractWe fully characterize the class of totally positive matrices whose inverses are M-matrices, ...
summary:The max algebra consists of the nonnegative real numbers equipped with two binary operations...
AbstractWe investigate classes of real square matrices possessing some weakened from of strict diago...
AbstractThe permanental-dominance conjecture for positive semidefinite Hermitian matrices A has attr...
AbstractWe characterize the class of matrices for which the set of supports of nonnegative vectors i...
AbstractIn this paper we study the maximal absolute values of determinants and subdeterminants of ±1...
AbstractLet P be the set of all n × n real matrices which have a positive determinant. We show here ...
AbstractThough total positivity appears in various branches of mathematics, it is rather unfamiliar ...
AbstractWe study the class of so-called totally dominant matrices in the usual algebra and in the ma...
AbstractA real matrix is called k-subtotally positive if the determinants of all its submatrices of ...
summary:A close relationship between the class of totally positive matrices and anti-Monge matrices ...
AbstractThis paper studies commuting matrices in max algebra and nonnegative linear algebra. Our sta...
AbstractWe present a table indicating whether or not each of five positivity classes of matrices (po...
This modern account of totally positive matrices treats their central properties with full proofs an...
In this work, we introduce the class of P 1 max -matrices for the max algebraandderivesomeprope...
AbstractWe fully characterize the class of totally positive matrices whose inverses are M-matrices, ...
summary:The max algebra consists of the nonnegative real numbers equipped with two binary operations...
AbstractWe investigate classes of real square matrices possessing some weakened from of strict diago...
AbstractThe permanental-dominance conjecture for positive semidefinite Hermitian matrices A has attr...
AbstractWe characterize the class of matrices for which the set of supports of nonnegative vectors i...
AbstractIn this paper we study the maximal absolute values of determinants and subdeterminants of ±1...
AbstractLet P be the set of all n × n real matrices which have a positive determinant. We show here ...
AbstractThough total positivity appears in various branches of mathematics, it is rather unfamiliar ...