The lower central and derived series of the braid groups of the projective plane

Abstract

We determine the lower central and derived series of the n-string braid groups Bn(RP2) of the real projective plane. We are motivated in part by the study of Fadell-Neuwirth short exact sequences, but the problem is interesting in its own right. For n=1,2, Bn(RP2) is finite and its lower central and derived series are known. If n>2 (resp. n>4), we show that the lower central (resp. derived) series of Bn(RP2) is constant from the commutator subgroup onwards, and we exhibit a presentation of the commutator subgroup. In the exceptional cases n=3,4, we determine explicitly the complete derived series of B3(RP2), we calculate the derived series of B4(RP2) up to and including its fifth term, and we obtain many of the derived series quotients in these two cases.