On the exponent of the Weak commutativity group (G)

Abstract

The weak commutativity group (G) is generated by two isomorphic groups G and G subject to the relations [g,g]=1 for all g ∈ G. The group (G) is an extension of D(G) = [G,G] by G × G. We prove that if G is a finite solvable group of derived length d, then (D(G)) divides (G)d if |G| is odd and (D(G)) divides 2d-1· (G)d if |G| is even. Further, if p is a prime and G is a p-group of class p-1, then (D(G)) divides (G). Moreover, if G is a finite p-group of class c≥ 2, then (D(G)) divides (G) p-1(c+1) (p≥ 3) and (D(G)) divides 2 2(c) · (G) 2(c)+1 (p=2).