Abelian IAPS: Difference between revisions
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{{group IAPS property}} | {{group IAPS property}} | ||
{{analogue | {{analogue of property| | ||
old generic context = group| | |||
old specific context = group| | |||
new generic context = IAPS| | |||
new specific context = IAPS| | |||
old property = Abelian group}} | |||
==Definition== | ==Definition== | ||
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===Symbol-free defintiion=== | ===Symbol-free defintiion=== | ||
An [[IAPS of groups]] is said to be ''' | An [[IAPS of groups]] is said to be '''abelian''' if every member is an [[abelian group]]. | ||
Latest revision as of 10:56, 23 June 2024
This article defines a property that can be evaluated for an IAPS of groups
ANALOGY: This is an analogue in IAPS of a property encountered in group. Specifically, it is a IAPS property analogous to the group property: Abelian group
View other analogues of Abelian group | View other analogues in IAPSs of group properties (OR, View as a tabulated list)
Definition
Symbol-free defintiion
An IAPS of groups is said to be abelian if every member is an abelian group.