Add to ORKGConsider the set of scalars $\alpha$ for which the $\alpha$th Hadamard power of any $n\times n$ positive semi-definite (p.s.d.) matrix with non-negative entries is p.s.d. It is known that this set is of the form $\{0, 1, \dots, n-3\}\cup [n-2, \infty)$. A natural question is "what is the possible form of the set of such $\alpha$ for a fixed p.s.d. matrix with non-negative entries?". In all examples appearing in the literature, the set turns out to be union of a finite set and a semi-infinite interval. In this article, examples of matrices are given for which the set consists of a finite set and more than one disjoint interval of positive length. In fact, it is proved that for some matrices, the number of such disjoint intervals can be made ...
Abstract. Recently, the authors established a number of inequalities involving integer powers of the...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
[[abstract]]In this paper, we investigate a class of matrices, called F-matrices, which contains sym...
AbstractWe consider the class Sn of all real positive semidefinite n×n matrices, and the subclass Sn...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
In previous work [Adv. Math. 298, pp. 325-368, 2016], the structure of the simultaneous kernels of H...
A classical theorem of I.J. Schoenberg characterizes functions that preserve positivity when applied...
In previous work Belton et al. (2016) 2], the structure of the simultaneous kernels of Hadamard powe...
For each n × n positive semidefinite matrix A we define the minimal index I (A)=max{λ ⪰ 0 : A ο B ⪰ ...
Abstract. Entrywise powers of matrices have been well-studied in the literature, and have recently r...
AbstractFor each n×n positive semidefinite matrix A we define the minimal index I(A)=max{λ⩾0:A∘B⪰λB ...
Existence of SBIBD(4k2, 2k2 + k, k2 + k) and Hadamard matrices with maximal excess It is shown that ...
It has long been known that totally nonnegative (or totally positive matrices) are closed under norm...
Abstract. Recently, the authors established a number of inequalities involving integer powers of the...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
[[abstract]]In this paper, we investigate a class of matrices, called F-matrices, which contains sym...
AbstractWe consider the class Sn of all real positive semidefinite n×n matrices, and the subclass Sn...
AbstractIt is known that if A is positive definite Hermitian, then A·A-1⩾I in the positive semidefin...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
In previous work [Adv. Math. 298, pp. 325-368, 2016], the structure of the simultaneous kernels of H...
A classical theorem of I.J. Schoenberg characterizes functions that preserve positivity when applied...
In previous work Belton et al. (2016) 2], the structure of the simultaneous kernels of Hadamard powe...
For each n × n positive semidefinite matrix A we define the minimal index I (A)=max{λ ⪰ 0 : A ο B ⪰ ...
Abstract. Entrywise powers of matrices have been well-studied in the literature, and have recently r...
AbstractFor each n×n positive semidefinite matrix A we define the minimal index I(A)=max{λ⩾0:A∘B⪰λB ...
Existence of SBIBD(4k2, 2k2 + k, k2 + k) and Hadamard matrices with maximal excess It is shown that ...
It has long been known that totally nonnegative (or totally positive matrices) are closed under norm...
Abstract. Recently, the authors established a number of inequalities involving integer powers of the...
AbstractLet A = (aij) be a real symmetric n × n positive definite matrix with non-negative entries. ...
[[abstract]]In this paper, we investigate a class of matrices, called F-matrices, which contains sym...