Extension of elementary p-groups and its application in classification of groups of prime exponent

Abstract

Let p be a prime number and Zp=Z/pZ. We study finite groups with abelian derived subgroup and exponent p in terms of group extension data and their matrix presentations. We show a one-to-one correspondence between the following two sets: (i) the isoclasses of class 2 groups of exponent p and order pm+n and with derived subgroup Zpn, and (ii) the set Gr(n,ASm(Zp))/GLm(Zp) of orbits of Gr(n,ASm(Zp)) under the congruence action by GLm(Zp), where Gr(n,ASm(Zp)) is the set of n-dimensional subspaces of anti-symmetric matrices of order m over Zp. We give a description of the orbit spaces Gr(2, ASm(Zp))/GLm(Zp) for all m and p by applying the theory of pencils of anti-symmetric matrices. Based on this, we show complete sets of representatives of orbits of Gr(3,AS4(Z3))/GL4(Z3), Gr(4, AS4(Z3))/GL4(Z3) and Gr(3, AS5(Z3))/GL5(Z3). As a consequence, we obtain a classification of corresponding class 2 groups of exponent p. In particular, we recover the classification of groups with exponent 3 and order 38.