Conversely, all such nonabelian 2-groups satisfy the assumptions of our theorem.

Let H be a fixed maximal subgroup in G. Then Z(G) < H so that Z(G) ≤ Φ(G). For each g ∈ G − H, g2 ∈ Z(G) (indeed, CG(g2) ≰ H) and so by a result of Burnside applied to G/Z(G), we have that H/Z(G) is abelian and g inverts each element of H/Z(G) (indeed, all elements in the set G/Z(G) − H/Z(G) have order 2). Hence each maximal subgroup of G/Z(G) is abelian and so we have either G' ≤ Z(G) (and then cl(G) = 2) or G/Z(G) is minimal nonabelian. Suppose that we have the second case. Since minimal nonabelian (two generator) group G/Z(G) is generated with involutions, we get G/Z(G) ≅ D8 and since g inverts each element of H/Z(G), it follows that H/Z(G) ≅ C4 so that H is abelian and G is not of class 2. But H was an arbitrary maximal subgroup in G so that each maximal subgroup of G is abelian. This implies that |G'| = 2 and so G' ≤ Z(G) and G is of class 2, a contradiction.

We have proved that G is of class 2. Since G/Z(G) is abelian and is generated by involutions, G/Z(G) is elementary abelian and so Φ(G) = ℧1(G) ≤ Z(G). But we have also Z(G) ≤ Φ(G) and so Φ(G) = Z(G).

Suppose that G possesses an abelian subgroup A > Z(G) such that A/Z(G) ≅ E4. Then A < G. Let K be a maximal subgroup of G which does not contain A. Then (A ∩ K) > Z(G) and if x ∈ (A ∩ K) − Z(G), then CG(x) ≰ K since A ≤ CG(a), a contradiction. We have proved that each maximal abelian subgroup in G is of order 2|Z(G)|. The theorem is proved since the converse is clear. $\square$