Splittings of link concordance groups

Abstract

We establish several results about two short exact sequences involving lower terms of the n-solvable filtration, \Fmn\ of the string link concordance group Cm. We utilize the Thom-Pontryagin construction to show that the Sato-Levine invariants μ(iijj) must vanish for 0.5-solvable links. Using this result, we show that the short exact sequence 0→ Fm0/Fm0.5 → Fm-0.5/Fm0.5 → Fm-0.5/Fm0 → 0 does not split for links of two or more components, in contrast to the fact that it splits for knots. Considering lower terms of the filtration \Fmn\ in the short exact sequence 0→ Fm-0.5/Fm0 → Cm/Fm0 → Cm/Fm-0.5 → 0, we show that while the sequence does not split for m 3, it does indeed split for m=2. We conclude that the quotient C2/F20 Z2 Z22 Z.