Abstract. This paper has studied some properties of circulant matrices, and makes use of the complex expression of quaternion to obtain that the circulant matrices over the quaternion field can be transformed into block-diagonal matrices under the unitary similarity.At the end of the article,we give a specific numerical example
This paper, by means of complex representation of a quaternion matrix, discusses the consimilarity o...
AbstractLet F be a field of characteristic ≠2, HF=a,bF the quaternion division ring over F. This pap...
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
AbstractWe introduce factor circulant matrices: matrices with the structure of circulants, but with ...
AbstractWe propose a unitary diagonalisation of a special class of quaternion matrices, the so-calle...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called η-Herm...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called η-Herm...
1. Introduction, In this note, some theorems which concern matrices of complex numbers are generaliz...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called ηη-Her...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called ηη-Her...
This paper, by means of complex representation of a quaternion matrix, discusses the consimilarity o...
AbstractLet F be a field of characteristic ≠2, HF=a,bF the quaternion division ring over F. This pap...
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
AbstractWe introduce factor circulant matrices: matrices with the structure of circulants, but with ...
AbstractWe propose a unitary diagonalisation of a special class of quaternion matrices, the so-calle...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called η-Herm...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called η-Herm...
1. Introduction, In this note, some theorems which concern matrices of complex numbers are generaliz...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called ηη-Her...
It is well known that (Formula presented.) -circulant matrices with (Formula presented.) can be simu...
We propose a unitary diagonalisation of a special class of quaternion matrices, the so-called ηη-Her...
This paper, by means of complex representation of a quaternion matrix, discusses the consimilarity o...
AbstractLet F be a field of characteristic ≠2, HF=a,bF the quaternion division ring over F. This pap...
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
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