On the singular value decomposition over finite fields and orbits of GU x GU
The singular value decomposition of a complex matrix is a fundamental concept in linear algebra and has proved extremely useful in many subjects. It is less clear what the situation is over a finite field. In this paper, we classify the orbits of GU(m,q) x GU(n,q) on n by n matrices (which is the an...
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| Main Author | |
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| Format | Journal Article |
| Language | English |
| Published |
17.05.2018
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| Subjects | |
| Online Access | Get full text |
| DOI | 10.48550/arxiv.1805.06999 |
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| Summary: | The singular value decomposition of a complex matrix is a fundamental concept
in linear algebra and has proved extremely useful in many subjects. It is less
clear what the situation is over a finite field. In this paper, we classify the
orbits of GU(m,q) x GU(n,q) on n by n matrices (which is the analog of the
singular value decomposition). The proof involves Kronecker's theory of pencils
and the Lang-Steinberg theorem for algebraic groups. Besides the motivation
mentioned above, this problem came up in a recent paper of Guralnick, Larsen
and Tiep where a concept of character level for the complex irreducible
characters of finite, general or special, linear and unitary groups was studied
and bounds on the number of orbits was needed. A consequence of this work
determines possible pairs of Jordan forms for nilpotent matrices of the form AB
where B is either the transpose of A or the conjugate transpose. |
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| DOI: | 10.48550/arxiv.1805.06999 |