Your search keyword '"Hermitian matrix"' showing total 5 results

1. Adjacency preservers on invertible hermitian matrices I.

Author

Orel, Marko

Subjects

*MATRICES (Mathematics), *BIJECTIONS, *FINITE fields, *MATHEMATICAL research, *ALGEBRAIC field theory

Abstract

Fundamental theorem of geometry of hermitian matrices characterizes all bijective maps on the space of all hermitian matrices, which preserve adjacency in both directions. In this and subsequent paper we characterize maps on the set of all invertible hermitian matrices over a finite field, which preserve adjacency in one direction. In this first paper it is shown that maps that preserve adjacency on the set of all invertible hermitian matrices over a finite field are necessarily bijective, so the corresponding graph on invertible hermitian matrices, where edges are defined by the adjacency relation, is a core. Besides matrix theory, the proof relies on results from several other mathematical areas, including spectral and chromatic graph theory, and finite geometry. [ABSTRACT FROM AUTHOR]

Published

2016

2. The enhanced principal rank characteristic sequence.

Author

Butler, Steve, Catral, Minerva, Fallat, Shaun M., Hall, H. Tracy, Hogben, Leslie, van den Driessche, P., and Young, Michael

Subjects

*RANK correlation (Statistics), *SYMMETRIC functions, *MATRICES (Mathematics), *HERMITIAN forms, *MATHEMATICAL functions, *SET theory

Abstract

The enhanced principal rank characteristic sequence (epr-sequence) of a symmetric n × n matrix is a sequence ℓ 1 ℓ 2 ⋯ ℓ n where ℓ k is A , S , or N according as all, some, or none of its principal minors of order k are nonzero. Such sequences give more information than the (0,1) pr-sequences previously studied (where basically the k th entry is 0 or 1 according as none or at least one of its principal minors of order k is nonzero). Various techniques including the Schur complement are introduced to establish that certain subsequences such as NAN are forbidden in epr-sequences over fields of characteristic not two. Using probabilistic methods over fields of characteristic zero, it is shown that any sequence of A s and S s ending in A is attainable, and any sequence of A s and S s followed by one or more N s is attainable; additional families of attainable epr-sequences are constructed explicitly by other methods. For real symmetric matrices of orders 2, 3, 4, and 5, all attainable epr-sequences are listed with justifications. [ABSTRACT FROM AUTHOR]

Published

2016

3. The principal rank characteristic sequence over various fields.

Author

Barrett, Wayne, Butler, Steve, Catral, Minerva, Fallat, Shaun M., Hall, H. Tracy, Hogben, Leslie, van den Driessche, P., and Young, Michael

Subjects

*MATHEMATICAL sequences, *LAPLACIAN matrices, *SYMMETRIC functions, *MATHEMATICAL formulas, *ALGEBRAIC field theory

Abstract

Given an n × n matrix, its principal rank characteristic sequence is a sequence of length n + 1 of 0s and 1s where, for k = 0 , 1 , … , n , a 1 in the k th position indicates the existence of a principal submatrix of rank k and a 0 indicates the absence of such a submatrix. The principal rank characteristic sequences for symmetric matrices over various fields are investigated, with all such attainable sequences determined for all n over any field with characteristic 2. A complete list of attainable sequences for real symmetric matrices of order 7 is reported. [ABSTRACT FROM AUTHOR]

Published

2014

4. The minimal rank of with respect to Hermitian matrix.

Author

Wang, Hongxing

Subjects

*HERMITIAN forms, *MATRICES (Mathematics), *SINGULAR value decomposition, *NUMERICAL solutions to equations, *REPRESENTATIONS of algebras, *MATHEMATICAL analysis

Abstract

Abstract: In this paper, we discuss the minimal rank of when X is Hermitian by applying singular value decomposition and some rank equalities of matrices, and obtain a representation of the minimal rank. Based on the representation, we obtain necessary and sufficient conditions for the matrix equation to have Hermitian solutions. [Copyright &y& Elsevier]

Published

2014

5. Equalities and inequalities for inertias of hermitian matrices with applications

Author

Tian, Yongge

Subjects

*MATHEMATICAL inequalities, *HERMITIAN structures, *MATRICES (Mathematics), *EIGENVALUES, *MULTIPLICITY (Mathematics), *MATHEMATICAL formulas

Abstract

Abstract: The inertia of a Hermitian matrix is defined to be a triplet composed of the numbers of the positive, negative and zero eigenvalues of the matrix counted with multiplicities, respectively. In this paper, we show some basic formulas for inertias of block Hermitian matrices. From these formulas, we derive various equalities and inequalities for inertias of sums, parallel sums, products of Hermitian matrices, submatrices in block Hermitian matrices, differences of outer inverses of Hermitian matrices. As applications, we derive the extremal inertias of the linear matrix expression with respect to a variable Hermitian matrix X. In addition, we give some results on the extremal inertias of Hermitian solutions to the matrix equation , as well as the extremal inertias of a partial block Hermitian matrix. [Copyright &y& Elsevier]

Published

2010