Search results for "Involutory matrix"

showing 4 items of 4 documents

Generalized centro-invertible matrices with applications

2014

Centro-invertible matrices are introduced by R.S. Wikramaratna in 2008. For an involutory matrix R, we define the generalized centro-invertible matrices with respect to R to be those matrices A such that RAR = A^−1. We apply these matrices to a problem in modular arithmetic. Specifically, algorithms for image blurring/deblurring are designed by means of generalized centro-invertible matrices. In addition, if R1 and R2 are n × n involutory matrices, then there is a simple bijection between the set of all centro-invertible matrices with respect to R1 and the set with respect to R2.

Centro-symmetric matrixSquare root of a 2 by 2 matrixApplied MathematicsInvolutory matrixINGENIERIA TELEMATICAMatrius (Matemàtica)Matrix ringMatrix multiplicationCombinatoricsMatrix (mathematics)Integer matrix2 × 2 real matricesCentro-invertible matrixMatrix analysisInvolutory matrixMATEMATICA APLICADAComputer Science::Distributed Parallel and Cluster ComputingMathematics
researchProduct

Characterizations of {K,s+1}-Potent Matrices and Applications

2012

Recently, situations where a matrix coincides with some of its powers have been studied. This kind of matrices is related to the generalized inverse matrices. On the other hand, it is possible to introduce another class of matrices that involve an involutory matrix, generalizing the well-known idempotent matrix, widely useful in many applications. In this paper, we introduce a new kind of matrices called {K,s+1}-potent, as an extension of the aforementioned ones. First, different properties of {K,s+1}-potent matrices have been developed. Later, the main result developed in this paper is the characterization of this kind of matrices from a spectral point of view, in terms of powers of the ma…

Inverse problemsMatrixGroup inverse matrixBlock representationLinear combinationsInvolutory matrixINGENIERIA TELEMATICAMatrius (Matemàtica)Idempotent matrixMatrix algebraSpectrumGroup inverseGeneralized inverseÀlgebra linealMATEMATICA APLICADA
researchProduct

Spectral study of {R, s + 1, k}- and {R, s + 1, k, *}-potent matrices

2020

[EN] The {R, s +1, k}- and {R, s +1, k, *}-potent matrices have been studied in several recent papers. We continue these investigations from a spectral point of view. Specifically, a spectral study of {R, s + 1, k} -potent matrices is developed using characterizations involving an associated matrix pencil (A, R). The corresponding spectral study for {R, s+ 1, k, *}-potent matrices involves the pencil (A*, R). In order to present some properties, the relevance of the projector I - AA(#). where A(#) is the group inverse of A is highlighted. In addition, some applications and numerical examples are given, particularly involving Pauli matrices and the quaternions.

S-potent matrixSpectrumMatrius (Matemàtica){R s+1 k}-potent matrixMATEMATICA APLICADAK-involutory matrix
researchProduct

Properties of a matrix group associated to a {K,s+1}-potent matrix

2012

In a previous paper, the authors introduced and characterized a new kind of matrices called {K,s+1}-potent. In this paper, an associated group to a {K, s+1}-potent matrix is explicitly constructed and its properties are studied. Moreover, it is shown that the group is a semidirect product of Z_2 acting on Z_{(s+1)^2-1}. For some values of s, more specifications on the group are derived. In addition, some illustrative examples are given.

Semidirect productAlgebra and Number TheoryGroup (mathematics)Involutory matrixMatrius (Matemàtica)CombinatoricsAlgebraMatrix (mathematics)Matrix groupGroupInvolutory matrixÀlgebra linealMATEMATICA APLICADAMathematics{K s + 1}-potent matrix
researchProduct