Robinson's conjecture on Abelian groups

Applying the method that we presented in , in this article we prove: "Let G be an elementary abelian p-group. Let n = dnl. If d(# p) is a prime not dividing nl, and the order w of d mod p satisfies w > 7 , then the Second Multiplier Theorem holds without the assumption nl > A, except that only one c

We use the classification of finite simple groups to demonstrate that Conjecture Ž Ž . . 4.1 of G. R. Robinson 1996, Proc. London Math. Soc. 3 72, 312᎐330 and Dade's projective conjecture hold for finite groups of p-local rank one.

We generalize and present simplified proofs almost all elementary lemmas from Section 8 of the Odd Order Paper. In many places we use Hall's enumeration principle and other simple combinatorial arguments. A number of related results are proved as well. Some open questions are posed. ᮊ 1998 Academic