On Kolchin's theorem (Q579381)
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scientific article; zbMATH DE number 4014932
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On Kolchin's theorem |
scientific article; zbMATH DE number 4014932 |
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On Kolchin's theorem (English)
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1986
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A well-known theorem due to Kolchin states that a semigroup of unipotent matrices over a field can be brought to triangular form over the field. Here it is proved that Kolchin's result follows from a theorem of Wedderburn. The result of Wedderburn asserts that a finite dimensional algebra over a field having a basis of nilpotent elements is nilpotent. It is also proved that if R is a finitely generated P.I. ring and S is a nil subring of R, then S is nilpotent. The proof uses a theorem of A. Braun saying that Jac(R) is nilpotent.
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semigroup of unipotent matrices
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triangular form
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finite dimensional algebra
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nilpotent elements
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finitely generated P.I. ring
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nil subring
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