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Minimization Problems for Generalized Reflexive and Generalized Anti-Reflexive Matrices

Year: 2013 Volume: 7 Issue: 5 896 - 902 Pages

• Authors:
• Yongxin Yuan

Abstract: Let R ∈ Cm×m and S ∈ Cn×n be nontrivial unitary involutions, i.e., RH = R = R−1 = ±Im and SH = S = S−1 = ±In. A ∈ Cm×n is said to be a generalized reflexive (anti-reflexive) matrix if RAS = A (RAS = −A). Let ρ be the set of m × n generalized reflexive (anti-reflexive) matrices. Given X ∈ Cn×p, Z ∈ Cm×p, Y ∈ Cm×q and W ∈ Cn×q, we characterize the matrices A in ρ that minimize AX−Z2+Y HA−WH2, and, given an arbitrary A˜ ∈ Cm×n, we find a unique matrix among the minimizers of AX − Z2 + Y HA − WH2 in ρ that minimizes A − A˜. We also obtain sufficient and necessary conditions for existence of A ∈ ρ such that AX = Z, Y HA = WH, and characterize the set of all such matrices A if the conditions are satisfied. These results are applied to solve a class of left and right inverse eigenproblems for generalized reflexive (anti-reflexive) matrices.

• Keywords:
• approximation
• generalized reflexive matrix
• generalized anti-reflexive matrix
• inverse eigenvalue problem.

The Inverse Eigenvalue Problem via Orthogonal Matrices

Year: 2010 Volume: 4 Issue: 9 1328 - 1333 Pages

• Authors:
• A. M. Nazari
• B. Sepehrian
• M. Jabari

Abstract: In this paper we study the inverse eigenvalue problem for symmetric special matrices and introduce sufficient conditions for obtaining nonnegative matrices. We get the HROU algorithm from [1] and introduce some extension of this algorithm. If we have some eigenvectors and associated eigenvalues of a matrix, then by this extension we can find the symmetric matrix that its eigenvalue and eigenvectors are given. At last we study the special cases and get some remarkable results.

• Keywords:
• Householder matrix
• nonnegative matrix
• Inverse eigenvalue problem.