Abstract
Abstract
We find an upper bound for the number of groups of order n up to isomorphism in the variety
${\mathfrak {S}}={\mathfrak {A}_p}{\mathfrak {A}_q}{\mathfrak {A}_r}$
, where p, q and r are distinct primes. We also find a bound on the orders and on the number of conjugacy classes of subgroups that are maximal amongst the subgroups of the general linear group that are also in the variety
$\mathfrak {A}_q\mathfrak {A}_r$
.
Publisher
Cambridge University Press (CUP)