Stallings' Group is Simply Connected at Infinity

Abstract

Let F2 be the free group on two generators and let Bn (n ≥ 2) denote the kernel of the homomorphism F2 × ·s (n) ·s × F2 → Z sending all generators to the generator 1 of Z. The groups Bk are called the Bieri-Stallings groups and Bk is type Fk-1 but not Fk. For n≥ 3 there are short exact sequences of the form 1 → Bn-1 → Bn → F2 → 1. This exact sequence can be used to show that Bn is (n-3)-connected at infinity for n≥ 3. Stallings' proved that B2 is finitely generated but not finitely presented. We conjecture that for n≥ 2, Bn is (n-2)-connected at infinity. For n=2, this means that B2 is 1-ended and for n=3 that B3 (typically called Stallings' group) is simply connected at infinity. We verify the conjecture for n=2 and n=3. Our main result is the case n=3: Stalling's group is simply connected at ∞.