The braid groups Bn,m(RP2) and the splitting problem of the generalised Fadell-Neuwirth short exact sequence

Abstract

Let n,m∈ N, and let Bn,m(RP2) be the set of (n + m)-braids of the projective plane whose associated permutation lies in the subgroup Sn× Sm of the symmetric group Sn+m. We study the splitting problem of the following generalisation of the Fadell-Neuwirth short exact sequence: 1→ Bm(RP2 \x1,…,xn\)→ Bn,m(RP2)q Bn(RP2)→ 1, where the map q can be considered geometrically as the epimorphism that forgets the last m strands, as well as the existence of a section of the corresponding fibration q:Fn+m(RP2)/Sn× Sm Fn(RP2)/Sn, where we denote by Fn(RP2) the nth ordered configuration space of the projective plane RP2. Our main results are the following: if n=1 the homomorphism q and the corresponding fibration q admits no section, while if n=2, then q and q admit a section. For n≥ 3, we show that if q and q admit a section then m 0, (n-1)2\ mod\ n(n-1). Moreover, using geometric constructions, we show that the homomorphism q and the fibration q admit a section for m=kn(2n-1)(2n-2), where k≥1, and for m=2n(n-1). In addition, we show that for m≥3, Bm(RP2\x1,…,xn\) is not residually nilpotent and for m≥ 5, it is not residually solvable.