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Strongly central series

From Groupprops

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This article defines a property that can be evaluated for a subgroup series

View a complete list of properties of subgroup series

Definition

A subgroup series

$G = K_{1} \geq K_{2} \geq K_{3} \geq \dots \geq K_{c} \geq K_{c + 1} = 1$

is termed strongly central if $[K_{i}, K_{j}] \leq K_{i + j}$ for every $i, j = 1, 2, \dots, c$ .

(A similar definition works for transfinite series).

Examples

The lower central series and upper central series of a nilpotent group are both examples of strongly central series. Further information: Lower central series is strongly central, Upper central series is strongly central

Relation with other properties

Weaker properties

Normal series: For full proof, refer: Strongly central series implies normal series
Central series: For full proof, refer: Strongly central series implies central series

References

Textbook references

Nilpotent groups and their automorphisms by Evgenii I. Khukhro, ISBN 3110136724, ^{More info}, Page 76, Section 3.2 (formal definition, around equation 3.2.5)

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Properties of subgroup series