Inverse eigenproblems and approximation problems for the generalized reflexive and antireflexive matrices with respect to a pair of generalized reflection matrices

Abstract

A matrix P is said to be a nontrivial generalized reflection matrix over the real quaternion algebra H if P =P≠ I and P2=I where means conjugate and transpose. We say that A∈Hn× n is generalized reflexive (or generalized antireflexive) with respect to the matrix pair (P,Q) if A=PAQ (or A=-PAQ) where P and Q are two nontrivial generalized reflection matrices of demension n. Let be one of the following subsets of Hn× n : (i) generalized reflexive matrix; (ii)reflexive matrix; (iii) generalized antireflexive matrix; (iiii) antireflexive matrix. Let Z∈Hn× m with rank( Z) =m and = diag( λ1,...,λm) . The inverse eigenproblem is to find a\ matrix A such that the set ( Z,) =\ A∈ | AZ=Z\ nonempty and find the general expression of A. In this paper, we investigate the inverse eigenproblem ( Z,) . Moreover, the approximation problem: A∈ A-E F is studied, where E is a given matrix over H\ and ·F is the Frobenius norm.