Least-norm and Extremal Ranks of the Least Square Solution to the Quaternion Matrix Equation AXB=C Subject to Two Equations
From MaRDI portal
Publication:3191849
DOI10.1142/S100538671400039XzbMath1303.15018OpenAlexW2161659645MaRDI QIDQ3191849
Publication date: 25 September 2014
Published in: Algebra Colloquium (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s100538671400039x
Matrices over special rings (quaternions, finite fields, etc.) (15B33) Matrix equations and identities (15A24)
Related Items (1)
Cites Work
- The matrix equations \(AX=C\), \(XB=D\)
- Least-squares solution with the minimum-norm for the matrix equation \((A\times B,G\times H) = (C,D)\)
- Extremal ranks of a quaternion matrix expression subject to consistent systems of quaternion matrix equations with applications
- On the symmetric solutions of linear matrix equations
- A pair of simultaneous linear matrix equations \(A_ 1XB_ 1=C_ 1,A_ 2XB_ 2=C_ 2\) and a matrix programming problem
- Ranks of least squares solutions of the matrix equation \(AXB=C\)
- Least squares Hermitian solution of the matrix equation \((AXB,CXD)=(E,F)\) with the least norm over the skew field of quaternions
- Ranks and the least-norm of the general solution to a system of quaternion matrix equations
- On the matrix equation \(AX=B\) with applications to the generators of a controllability matrix
- On the symmetric solutions of a linear matrix equation
- Minimum norm regularization of descriptor systems by mixed output feedback
- The spectral theorem in quaternions
- Two matrix-based proofs that the linear estimator \(G y\) is the best linear unbiased estimator
- Upper and lower bounds for ranks of matrix expressions using generalized inverses
- Extreme ranks of the solution to a consistent system of linear quaternion matrix equations with an application
- The expansion problem of anti-symmetric matrix under a linear constraint and the optimal approximation
- \(P\)-(skew)symmetric common solutions to a pair of quaternion matrix equations
- Extreme ranks of a linear quaternion matrix expression subject to triple quaternion matrix equations with applications
- On equality and proportionality of ordinary least squares, weighted least squares and best linear unbiased estimators in the general linear model
- Nonnegative definite and positive definite solutions to the matrix equationAXA*=B
- PARTIALLY SUPERFLUOUS OBSERVATIONS
- Inertia and Rank Characterizations of Some Matrix Expressions
- Hermitian and Nonnegative Definite Solutions of Linear Matrix Equations
- Regularization of Singular Systems by Derivative and Proportional Output Feedback
- Ranks of Solutions of the Matrix Equation AXB = C
This page was built for publication: Least-norm and Extremal Ranks of the Least Square Solution to the Quaternion Matrix Equation AXB=C Subject to Two Equations
