On the triple product property for subgroups of finite nilpotent groups of class 2

Abstract

A number of upper bounds are proved relating to the triple product property (TPP) for subgroups of finite nilpotent groups of class 2. The TPP is the property defined for three non-empty subsets S, T, U of a group G that the group equation s's-1t't-1u'u-1 = 1, over pairs of elements s', s ∈ S, t', t ∈ T, u', u ∈ U, is satisfied if and only if s' = s, t' = t, u' = u. When G is finite, and the parameter 0(G), called subgroup TPP ratio, is defined as 0(G) := |S||T||U||G|, where the maximum is over the collection of all triples of subgroups S, T, U of G satisfying the TPP, this paper proves that (1) 0(G) < |G:Z(G) for (all) groups of nilpotency class 2, (2) 0(G) ≤ p for p-groups with a cyclic commutator subgroup of order p, (3) 0(G) = 1 for p-groups of nilpotency class 2 with a "large" centre, loosely defined as those satisfying p2 ≤ |G:Z(G)| ≤ p3, (4) and 0(G) = 1 for p-groups of nilpotency class 2 with "small" (irreducible, complex) character degrees of 1 or p.