On subgroups and equivalent relations
This paper is an exposition of "Subgroups and Equivalence Relations", by Pierre J. Malraison, Jr. (1977). It contains key results detailing the relationship between subgroups and equivalence relations. The results were obtained using the concepts of group action and commutator groups. 1) I...
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1998
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oai:animorepository.dlsu.edu.ph:etd_bachelors-170092021-11-29T07:28:08Z On subgroups and equivalent relations Baysic, Celestina Chen Cen Sio, Dennis Tan This paper is an exposition of "Subgroups and Equivalence Relations", by Pierre J. Malraison, Jr. (1977). It contains key results detailing the relationship between subgroups and equivalence relations. The results were obtained using the concepts of group action and commutator groups. 1) If G is a group and R is an equivalence relation on G, the following are equivalent: (i) R is closed under products in G x G; (ii) R is a subgroup of G x G; (iii) R is the relation of belonging to the same coset of some normal subgroup of G. 2) If the equivalence relation R is a subgroup of G x G, then the following are equivalent: i) R is normal in G x G. ii) G/[e] is abelian. iii) G' is a subgroup of [e]. 1998-01-01T08:00:00Z text https://animorepository.dlsu.edu.ph/etd_bachelors/16496 Bachelor's Theses English Animo Repository Group actions (Mathematics) Algebraic varieties Topological transformation groups Equivalence relations (Set theory) |
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De La Salle University |
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De La Salle University Library |
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Asia |
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Philippines Philippines |
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De La Salle University Library |
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DLSU Institutional Repository |
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English |
| topic |
Group actions (Mathematics) Algebraic varieties Topological transformation groups Equivalence relations (Set theory) |
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Group actions (Mathematics) Algebraic varieties Topological transformation groups Equivalence relations (Set theory) Baysic, Celestina Chen Cen Sio, Dennis Tan On subgroups and equivalent relations |
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This paper is an exposition of "Subgroups and Equivalence Relations", by Pierre J. Malraison, Jr. (1977). It contains key results detailing the relationship between subgroups and equivalence relations. The results were obtained using the concepts of group action and commutator groups. 1) If G is a group and R is an equivalence relation on G, the following are equivalent: (i) R is closed under products in G x G; (ii) R is a subgroup of G x G; (iii) R is the relation of belonging to the same coset of some normal subgroup of G. 2) If the equivalence relation R is a subgroup of G x G, then the following are equivalent: i) R is normal in G x G. ii) G/[e] is abelian. iii) G' is a subgroup of [e]. |
| format |
text |
| author |
Baysic, Celestina Chen Cen Sio, Dennis Tan |
| author_facet |
Baysic, Celestina Chen Cen Sio, Dennis Tan |
| author_sort |
Baysic, Celestina |
| title |
On subgroups and equivalent relations |
| title_short |
On subgroups and equivalent relations |
| title_full |
On subgroups and equivalent relations |
| title_fullStr |
On subgroups and equivalent relations |
| title_full_unstemmed |
On subgroups and equivalent relations |
| title_sort |
on subgroups and equivalent relations |
| publisher |
Animo Repository |
| publishDate |
1998 |
| url |
https://animorepository.dlsu.edu.ph/etd_bachelors/16496 |
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1772835120370155520 |