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ON THE NUMBER OF CONJUGACY CLASSES IN FINITE $p$-GROUPS

Published online by Cambridge University Press:  17 November 2003

A. JAIKIN-ZAPIRAIN
Affiliation:
Departamento de Matemáticas, Facultad de Ciencias, Universidad Autónoma de Madrid, Cantoblanco, Madrid 28049, Spain
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Abstract

In this study of the behaviour of the number of conjugacy classes in finite $p$-groups using pro-$p$ groups, the conjugacy growth function $r_n(G)= \max\{r(G/N)\,{|}\,N\triangleleft_o G,|G\,{:}\,N|=n\}$ is introduced. It is proved that there are no infinite pro-$p$ groups of linear conjugacy growth (that is, there is no $c$ such that $r_n(G)\le c\log_2 n$ for all $n>1$) and it is shown that many known pro-$p$ groups are of exponential conjugacy growth (that is, there exists $\epsilon\,{>}\,0$ such that $r_n(G)\,{\ge}\,n^\epsilon$ for infinitely many values of $n$).

Type
Notes and Papers
Copyright
The London Mathematical Society 2003

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Footnotes

This work was partially supported by MCYT grants BFM2001-0201, BFM2001-0180, FEDER and the Ramón y Cajal Program.