AbstractThis paper defines a new type of matrix (which will be called a centro-invertible matrix) with the property that the inverse can be found by simply rotating all the elements of the matrix through 180 degrees about the mid-point of the matrix. Centro-invertible matrices have been demonstrated in a previous paper to arise in the analysis of a particular algorithm used for the generation of uniformly-distributed pseudo-random numbers.An involutory matrix is one for which the square of the matrix is equal to the identity. It is shown that there is a one-to-one correspondence between the centro-invertible matrices and the involutory matrices. When working in modular arithmetic this result allows all possible k by k centro-invertible matr...
An element x in a ring R is called right (resp. left) invertible if there exists y ∈ R such that xy ...
Abstract. In this paper we revisit the modular inversion hidden number problem and the inversive con...
Centrosymmetric matrices have been recently studied on an algebraic point of view: properties like t...
AbstractThis paper defines a new type of matrix (which will be called a centro-invertible matrix) wi...
Centro-invertible matrices are introduced by R.S. Wikramaratna in 2008. For an involutory matrix R, ...
This paper deals with generalized centro-invertible matrices introduced by the authors in Lebtahi et...
We show that a perturbation of any fixed square matrix D by a random unitary matrix is well invertib...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, May, 2020Cataloged...
AbstractFor any finite field F we determine the number of n by n matrices of skew-centrosymmetric fo...
Quantitative invertibility of random matrices: a combinatorial perspective, Discrete Analysis 2021:1...
AbstractWe consider square matrices A that commute with a fixed square matrix K, both with entries i...
We study n by n symmetric random matrices H, possibly discrete, with iid above-diagonal entries. We ...
Abstract. A centrosymmetric permutation is one which is invariant under the reversecomplement operat...
AbstractA nonsingular n×n-matrix A=(aij) is called centrogonal if A−1=(an+1−i,n+1−j); it is called p...
AbstractThe elements in the group of centrosymmetric n×n permutation matrices are the extreme points...
An element x in a ring R is called right (resp. left) invertible if there exists y ∈ R such that xy ...
Abstract. In this paper we revisit the modular inversion hidden number problem and the inversive con...
Centrosymmetric matrices have been recently studied on an algebraic point of view: properties like t...
AbstractThis paper defines a new type of matrix (which will be called a centro-invertible matrix) wi...
Centro-invertible matrices are introduced by R.S. Wikramaratna in 2008. For an involutory matrix R, ...
This paper deals with generalized centro-invertible matrices introduced by the authors in Lebtahi et...
We show that a perturbation of any fixed square matrix D by a random unitary matrix is well invertib...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, May, 2020Cataloged...
AbstractFor any finite field F we determine the number of n by n matrices of skew-centrosymmetric fo...
Quantitative invertibility of random matrices: a combinatorial perspective, Discrete Analysis 2021:1...
AbstractWe consider square matrices A that commute with a fixed square matrix K, both with entries i...
We study n by n symmetric random matrices H, possibly discrete, with iid above-diagonal entries. We ...
Abstract. A centrosymmetric permutation is one which is invariant under the reversecomplement operat...
AbstractA nonsingular n×n-matrix A=(aij) is called centrogonal if A−1=(an+1−i,n+1−j); it is called p...
AbstractThe elements in the group of centrosymmetric n×n permutation matrices are the extreme points...
An element x in a ring R is called right (resp. left) invertible if there exists y ∈ R such that xy ...
Abstract. In this paper we revisit the modular inversion hidden number problem and the inversive con...
Centrosymmetric matrices have been recently studied on an algebraic point of view: properties like t...