A factorisation problem in the symmetric group is central if any two permutations in the same conjugacy class have the same number of factorisations. We give the first fully combinatorial proof of the centrality of transitive star factorisations that is valid in all genera, which answers a natural question of Goulden and Jackson from 2009. Our proof is through a bijection to a class of monotone double Hurwitz factorisations. These latter factorisations are also not obviously central, so we also give a combinatorial proof of their centrality. As a corollary we obtain new formulae for some monotone double Hurwitz numbers, and a new relation between Hurwitz and monotone Hurwitz numbers. We also generalise a theorem of Goulden and Jackson from 2009 that states that the transitive power of Jucys-Murphy elements are central. Our theorem states that the transitive image of any symmetric function evaluated at Jucys-Murphy elements is central, which gives a transitive version of Jucys' original result from 1974.
