Tarski monster group
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In the area of modern algebra known as group theory, a Tarski monster group, named for Alfred Tarski, is an infinite group G, such that every proper subgroup H of G, other than the identity subgroup, is a cyclic group of order a fixed prime number p. A Tarski monster group is necessarily simple. It was shown by Alexander Yu. Olshanskii in 1979 that Tarski groups exist, and that there is a Tarski p-group for every prime p > 1075. They are a source of counterexamples to conjectures in group theory, most importantly to Burnside's problem and the von Neumann conjecture.
DefinitionEdit
Let <math>p</math> be a fixed prime number. An infinite group <math>G</math> is called a Tarski monster group for <math>p</math> if every nontrivial subgroup (i.e. every subgroup other than 1 and G itself) has <math>p</math> elements.
PropertiesEdit
- <math>G</math> is necessarily finitely generated. In fact it is generated by every two non-commuting elements.
- <math>G</math> is simple. If <math>N\trianglelefteq G</math> and <math>U\leq G</math> is any subgroup distinct from <math>N</math> the subgroup <math>NU</math> would have <math>p^2</math> elements.
- The construction of Olshanskii shows in fact that there are continuum-many non-isomorphic Tarski Monster groups for each prime <math>p>10^{75}</math>.
- Tarski monster groups are examples of non-amenable groups not containing any free subgroups.
ReferencesEdit
- A. Yu. Olshanskii, An infinite group with subgroups of prime orders, Math. USSR Izv. 16 (1981), 279–289; translation of Izvestia Akad. Nauk SSSR Ser. Matem. 44 (1980), 309–321.
- A. Yu. Olshanskii, Groups of bounded period with subgroups of prime order, Algebra and Logic 21 (1983), 369–418; translation of Algebra i Logika 21 (1982), 553–618.
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