A family of Andrews-Curtis trivializations via 4-manifold trisections

Abstract

An R-link is an n-component link L in S3 such that Dehn surgery on L yields \#n(S1 × S2). Every R-link L gives rise to a geometrically simply-connected homotopy 4-sphere XL, which in turn can be used to produce a balanced presentation of the trivial group. Adapting work of Gompf, Scharlemann, and Thompson, Meier and Zupan produced a family of R-links L(p,q;c/d), where the pairs (p,q) and (c,d) are relatively prime and c is even. For this family, L(3,2;2n/(2n+1)) induces the infamous trivial group presentation x,y \, | \, xyx=yxy, xn+1=yn , a popular collection of potential counterexamples to the Andrews-Curtis conjecture for n ≥ 3. In this paper, we use 4-manifold trisections to show that the group presentations corresponding to a different family, L(3,2;4/d), are Andrews-Curtis trivial for all d.