P-constrained group
The article defines a property of groups, where the definition may be in terms of a particular prime that serves as parameter
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Definition
Let be a finite group and be a prime number. We say that is -constrained if the following is true for one (and hence, any) -Sylow subgroup of :
.
Here, denotes the centralizer of in . is the second member of the lower pi-series for .
Relation with other properties
Stronger properties
- Strongly p-solvable group
- p-solvable group: For proof of the implication, refer p-solvable implies p-constrained and for proof of its strictness (i.e. the reverse implication being false) refer p-constrained not implies p-solvable.
Metaproperties
Subgroups
This group property is not subgroup-closed, viz., we can have a group satisfying the property, with a subgroup not satisfying the property
A subgroup of a -constrained group need not be a -constrained group. For full proof, refer: p-constrained is not subgroup-closed
Quotients
This group property is not quotient-closed, viz., we could have a group with the property and a quotient group of that group that does not have the property
A quotient of a -constrained group need not be a -constrained group. For full proof, refer: p-constrained is not quotient-closed