Groups of Prime Power Order with Derived Subgroup of Prime Order

Let V be a representation of a finite group G over a field of characteristic p. If p does not divide the group order, then Molien's formula gives the Hilbert series of the invariant ring. In this paper we find a replacement of Molien's formula which works in the case that G is divisible by p but not

Let S=(a 1 , a 2 , ..., a 2n&1 ) be a sequence of 2n&1 elements in an Abelian group G of order n (written additively). For a # G, let r(S, a) be the number of subsequences of length exactly n whose sum is a. Erdo s et al. [1] proved that r(S, 0) 1. In [2], Mann proved that if n (=p) is a prime, then

Let Z n be a cyclic group of order n and ) implies that S and T are conjugate in Aut(Z n ), the automorphism group of Z n . In this paper, we give a complete classification for DCI-subsets of Z n in the case of n= p a , where p is an odd prime.