Algebraic Aspects of combined matrices

Abstract

In this work, we present algebraic results concerning the combined matrices C(A), where the entries of A belong to a number field K and A is a non-singular matrix. In other words, A is a n× n matrix belonging to the General Linear Group over K, denoted by GLn(K). We also analyze the case in which matrix A belongs to algebraic subgroups of GLn(K), such as the unimodular group, where A2 is a n× n matrix belonging to the Special Linear Group, denoted by SLn(K), triangular groups, diagonal groups, among others. In particular, we thouroughly examine the cases n=2 and n=3 for symmetric and non-symmetric matrices, providing explicit diagonalization of C(A), which includes characteristic polynomials with their eigenvalues and eigenfactors.