Add to ORKGIt is known that any symmetric matrix $M$ with entries in $\R[x]$ and which is positive semi-definite for any substitution of $x\in\R$, has a Smith normal form whose diagonal coefficients are constant sign polynomials in $\R[x]$. \par We generalize this result by considering a symmetric matrix $M$ with entries in a formally real principal domain $A$, we assume that $M$ is positive semi-definite for any ordering on $A$ and, under one additionnal hypothesis concerning non-real primes, we show that the Smith normal of $M$ is positive, up to association. Counterexamples are given when this last hypothesis is not satisfied.\par We give also a partial extension of our results to the case of Dedekind domains
Abstract. Let M be an archimedean quadratic module of real t × t matrix polynomials in n variables, ...
AbstractIf K is a field and char K ≠ 2, then an element α ϵ K is a sum of squares in K if and only i...
AbstractA matrix [aij(α)xij] is shown to be positive semidefinite or positive definite if the matrix...
AbstractIf H(A) = (A + A∗)/2 and c is real, it is determined when cH(A-1 − H(A)-1 is positive defini...
The Smith normal form and left good matrix have been known in matrix theorem. Any matrix over the pr...
Let A be an n-by-n matrix with real entries. We show that a necessary and sufficient condition for A...
AbstractIt is shown that a sufficient condition for a nonnegative real symmetric matrix to be comple...
AbstractThe relation between positivity of principal minors, sign symmetry and stability of matrices...
AbstractLet A be an n-by-n matrix with real entries. We show that a necessary and sufficient conditi...
AbstractA new necessary and sufficient condition is given for all principal minors of a square matri...
AbstractLet A be a n × n symmetric matrix and in the closure of inverse M-matrices. Then A can be fa...
AbstractGiven that B,C2,…,Ck are positive semidefinite (PSD) n-by-n real matrices and B is entrywise...
summary:Our purpose is to present a number of new facts about the structure of semipositive matrices...
summary:Our purpose is to present a number of new facts about the structure of semipositive matrices...
AbstractIf K is a field and char K ≠ 2, then an element α ϵ K is a sum of squares in K if and only i...
Abstract. Let M be an archimedean quadratic module of real t × t matrix polynomials in n variables, ...
AbstractIf K is a field and char K ≠ 2, then an element α ϵ K is a sum of squares in K if and only i...
AbstractA matrix [aij(α)xij] is shown to be positive semidefinite or positive definite if the matrix...
AbstractIf H(A) = (A + A∗)/2 and c is real, it is determined when cH(A-1 − H(A)-1 is positive defini...
The Smith normal form and left good matrix have been known in matrix theorem. Any matrix over the pr...
Let A be an n-by-n matrix with real entries. We show that a necessary and sufficient condition for A...
AbstractIt is shown that a sufficient condition for a nonnegative real symmetric matrix to be comple...
AbstractThe relation between positivity of principal minors, sign symmetry and stability of matrices...
AbstractLet A be an n-by-n matrix with real entries. We show that a necessary and sufficient conditi...
AbstractA new necessary and sufficient condition is given for all principal minors of a square matri...
AbstractLet A be a n × n symmetric matrix and in the closure of inverse M-matrices. Then A can be fa...
AbstractGiven that B,C2,…,Ck are positive semidefinite (PSD) n-by-n real matrices and B is entrywise...
summary:Our purpose is to present a number of new facts about the structure of semipositive matrices...
summary:Our purpose is to present a number of new facts about the structure of semipositive matrices...
AbstractIf K is a field and char K ≠ 2, then an element α ϵ K is a sum of squares in K if and only i...
Abstract. Let M be an archimedean quadratic module of real t × t matrix polynomials in n variables, ...
AbstractIf K is a field and char K ≠ 2, then an element α ϵ K is a sum of squares in K if and only i...
AbstractA matrix [aij(α)xij] is shown to be positive semidefinite or positive definite if the matrix...