The Hurwitz action in complex reflection groups
Abstract
We enumerate Hurwitz orbits of shortest reflection factorizations of an arbitrary element in the infinite family G(m, p, n) of complex reflection groups. As a consequence, we characterize the elements for which the action is transitive and give a simple criterion to tell when two shortest reflection factorizations belong to the same Hurwitz orbit. We also characterize the quasi-Coxeter elements (those with a shortest reflection factorization that generates the whole group) in G(m, p, n).
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