The Splitting of Generalisations of the Fadell-Neuwirth short exact sequence

Abstract

We study some generalisations to mixed braid groups of the Fadell-Neuwirth short exact sequence and the possible splitting of this sequence. In certain cases, we determine conditions under which the projection from the mixed braid group Bn1,…,nk(M) to Bn1,…, nk-q(M) admits a section, where M is either the torus or the Klein bottle, n1, …, nk,q ∈ N, and 1≤ q ≤ k-1. For k≥ 2 and q=k-1, we show that this projection admits a section if and only if n1 divides ni for all i=2,…, k. We present some partial conclusions in the case k≥ 3 and q=1. To obtain our results, we compute and make use of suitable mixed braid groups of M, as well as certain key quotients that play a central r\ole in our analysis.