Projective special linear group:PSL(2,19): Difference between revisions

Revision as of 20:47, 30 August 2012

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VIEW FACTS ABOUT THIS GROUP: All factsGroup property satisfactionsSubgroup property satisfactionsGroup property dissatisfactionsSubgroup property satisfactions
VIEW DEFINITIONS USING THIS AS EXAMPLE: All terms |Group properties |Subgroup properties|
VIEW FACTS USING THIS AS EXAMPLE: All facts |Group property non-implications |Subgroup property non-implications |Group metaproperty dissatisfactionsSubgroup metaproperty dissatisfactions

Definition

This finite group is defined as the projective special linear group of degree two over field:F19, the field with 19 elements.

Arithmetic functions

Function	Value	Similar groups	Explanation
order (number of elements, equivalently, cardinality or size of underlying set)	3420	groups with same order	As $PSL(2,q)$ , $q=19$ : $(q^{3}-q)/2=q(q-1)(q+1)/2=(19^{3}-19)/2=19(19-1)(19+1)/2=3420$
exponent of a group	3420	groups with same order and exponent of a group \| groups with same exponent of a group	As $PSL(2,q)$ , $q=19$ , $p=19$ where $p$ is the characteristic: $p(q^{2}-1)/4=19(19^{2}-1)/4=1710$

Group properties

Property	Satisfied?	Explanation	Corollary properties satisfied/dissatisfied
simple group, simple non-abelian group	Yes	projective special linear group is simple except in finitely many cases, but this isn't one of the finite exceptions
minimal simple group	No	Contains subgroup isomorphic to alternating group:A5. See also classification of finite minimal simple groups
solvable group	No		Dissatisfies: nilpotent group, abelian group

GAP implementation

Description	Functions used
`PSL(2,19)`	PSL

@@ Line 22: / Line 22: @@
 | [[satisfies property::simple group]], [[satisfies property::simple non-abelian group]] || Yes || [[projective special linear group is simple]] except in finitely many cases, but this isn't one of the finite exceptions ||
 |-
-| [[dissatisfies property::minimal simple group]] || No || See [[classification of finite minimal simple groups]] ||
+| [[dissatisfies property::minimal simple group]] || No || Contains subgroup isomorphic to [[alternating group:A5]]. See also [[classification of finite minimal simple groups]] ||
 |-
 | [[dissatisfies property::solvable group]] || No || || Dissatisfies: [[dissatisfies property::nilpotent group]], [[dissatisfies property::abelian group]]