On the extraordinary construction of cycle sets by Wolfgang Rump
Cycle sets are algebraic structures introduced by Rump to study set theoretic solutions to the Yang-Baxter equation. While studying cycle sets Rump also introduced braces, which have since overtaken cycle sets as a tool for studying solutions. This survey paper is primarily an introduction to cycle...
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| creator | Bhandari, Pravin Córdoba, Miguel Henderson, Jamie Warrander, Scott |
| description | Cycle sets are algebraic structures introduced by Rump to study set theoretic
solutions to the Yang-Baxter equation. While studying cycle sets Rump also
introduced braces, which have since overtaken cycle sets as a tool for studying
solutions. This survey paper is primarily an introduction to cycle sets,
motivating their study and relating them to key results of brace theory and
Yang-Baxter theory. It is aimed at anyone from those already very familiar with
braces but less familiar with cycle sets, to those with only a basic level of
background in ring theory and group theory. We introduce cycle sets following
Rump's original results - giving more detailed, easy to follow versions of his
proofs - and then relate them back to left braces. We also go on to discuss
interesting constructions of cycle sets which do not necessarily correspond
directly to braces. |
| doi_str_mv | 10.48550/arxiv.2106.05149 |
| format | Article |
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solutions to the Yang-Baxter equation. While studying cycle sets Rump also
introduced braces, which have since overtaken cycle sets as a tool for studying
solutions. This survey paper is primarily an introduction to cycle sets,
motivating their study and relating them to key results of brace theory and
Yang-Baxter theory. It is aimed at anyone from those already very familiar with
braces but less familiar with cycle sets, to those with only a basic level of
background in ring theory and group theory. We introduce cycle sets following
Rump's original results - giving more detailed, easy to follow versions of his
proofs - and then relate them back to left braces. We also go on to discuss
interesting constructions of cycle sets which do not necessarily correspond
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solutions to the Yang-Baxter equation. While studying cycle sets Rump also
introduced braces, which have since overtaken cycle sets as a tool for studying
solutions. This survey paper is primarily an introduction to cycle sets,
motivating their study and relating them to key results of brace theory and
Yang-Baxter theory. It is aimed at anyone from those already very familiar with
braces but less familiar with cycle sets, to those with only a basic level of
background in ring theory and group theory. We introduce cycle sets following
Rump's original results - giving more detailed, easy to follow versions of his
proofs - and then relate them back to left braces. We also go on to discuss
interesting constructions of cycle sets which do not necessarily correspond
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solutions to the Yang-Baxter equation. While studying cycle sets Rump also
introduced braces, which have since overtaken cycle sets as a tool for studying
solutions. This survey paper is primarily an introduction to cycle sets,
motivating their study and relating them to key results of brace theory and
Yang-Baxter theory. It is aimed at anyone from those already very familiar with
braces but less familiar with cycle sets, to those with only a basic level of
background in ring theory and group theory. We introduce cycle sets following
Rump's original results - giving more detailed, easy to follow versions of his
proofs - and then relate them back to left braces. We also go on to discuss
interesting constructions of cycle sets which do not necessarily correspond
directly to braces.</abstract><doi>10.48550/arxiv.2106.05149</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Rings and Algebras |
| title | On the extraordinary construction of cycle sets by Wolfgang Rump |
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