Abstract
We establish and comment on a surprising relationship between the behaviour modulo a prime p of the number s n ( G ) of index n subgroups in a group G , and that of the corresponding subgroup numbers for a subnormal subgroup of p-power index in G . One of the applications of this result presented here concerns the explicit determination modulo p of s n ( G ) in the case when G is the fundamental group of a finite graph of finite p-groups. As another application, we extend one of the main results of the second author's paper (Forum Math, in press) concerning the p-patterns of free powers G * q of a finite group G with q a p-power to groups of the more general form H * G * q , where H is any finite p-group.
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