Add to ORKGIn previous work [Adv. Math. 298, pp. 325-368, 2016], the structure of the simultaneous kernels of Hadamard powers of any positive semidefinite matrix were described. Key ingredients in the proof included a novel stratification of the cone of positive semidefinite matrices and a well-known theorem of Hershkowitz, Neumann, and Schneider, which classifies the Hermitian positive semidefinite matrices whose entries are $0$ or $1$ in modulus. In this paper, we show that each of these results extends to a larger class of matrices which we term $3$-PMP (principal minor positive)
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
AbstractFor each n×n positive semidefinite matrix A we define the minimal index I(A)=max{λ⩾0:A∘B⪰λB ...
AbstractSome quadratic identities associated with positive definite Hermitian matrices are derived b...
In previous work Belton et al. (2016) 2], the structure of the simultaneous kernels of Hadamard powe...
In previous work [Adv. Math. 298:325–368, 2016], the structure of the simultaneous kernels of Hadama...
Consider the set of scalars $\alpha$ for which the $\alpha$th Hadamard power of any $n\times n$ posi...
AbstractWe consider the class Sn of all real positive semidefinite n×n matrices, and the subclass Sn...
Abstract. Entrywise powers of matrices have been well-studied in the literature, and have recently r...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractPolynomials have proven to be useful tools to tailor generic kernels to specific application...
A classical theorem of I.J. Schoenberg characterizes functions that preserve positivity when applied...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
For each n × n positive semidefinite matrix A we define the minimal index I (A)=max{λ ⪰ 0 : A ο B ⪰ ...
AbstractAn m-by-n matrix A is called totally nonnegative if every minor of A is nonnegative. The Had...
A classical result by Schoenberg (1942) identifies all real-valued functions that preserve positive ...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
AbstractFor each n×n positive semidefinite matrix A we define the minimal index I(A)=max{λ⩾0:A∘B⪰λB ...
AbstractSome quadratic identities associated with positive definite Hermitian matrices are derived b...
In previous work Belton et al. (2016) 2], the structure of the simultaneous kernels of Hadamard powe...
In previous work [Adv. Math. 298:325–368, 2016], the structure of the simultaneous kernels of Hadama...
Consider the set of scalars $\alpha$ for which the $\alpha$th Hadamard power of any $n\times n$ posi...
AbstractWe consider the class Sn of all real positive semidefinite n×n matrices, and the subclass Sn...
Abstract. Entrywise powers of matrices have been well-studied in the literature, and have recently r...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractPolynomials have proven to be useful tools to tailor generic kernels to specific application...
A classical theorem of I.J. Schoenberg characterizes functions that preserve positivity when applied...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
For each n × n positive semidefinite matrix A we define the minimal index I (A)=max{λ ⪰ 0 : A ο B ⪰ ...
AbstractAn m-by-n matrix A is called totally nonnegative if every minor of A is nonnegative. The Had...
A classical result by Schoenberg (1942) identifies all real-valued functions that preserve positive ...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
AbstractFor each n×n positive semidefinite matrix A we define the minimal index I(A)=max{λ⩾0:A∘B⪰λB ...
AbstractSome quadratic identities associated with positive definite Hermitian matrices are derived b...