A Markov theorem for generalized plat decomposition

Abstract

We prove a Markov theorem for tame links in a connected closed orientable 3-manifold M with respect to a plat-like representation. More precisely, given a genus g Heegaard surface g for M we represent each link in M as the plat closure of a braid in the surface braid group Bg,2n=π1(C2n(g)) and analyze how to translate the equivalence of links in M under ambient isotopy into an algebraic equivalence in Bg,2n. First, we study the equivalence problem in g× [0,1], and then, to obtain the equivalence in M, we investigate how isotopies corresponding to "sliding" along meridian discs change the braid representative. At the end we provide explicit constructions for Heegaard genus 1 manifolds, i.e. lens spaces and S2× S1.