Concurring reduction schemes for Dirac structures

Abstract

The notion of concurrence was recently proposed as the natural compatibility relation between Dirac structures, generalizing the commutativity of two Poisson structures. We address the question of when a reduction scheme -- that is, a way to induce a Dirac structure on a quotient of a submanifold -- respects this relation. After characterizing the minimal scheme of Dirac reduction, we prove that two concurring Dirac structures have concurring reductions whenever they share a common witness, extending to Dirac geometry the reduction of the Marsden-Ratiu theorem. Two procedures for constructing such common witnesses are given, the second being the Dirac counterpart of Magri's original recipe in bihamiltonian geometry. Examples drawn from Hamiltonian actions, Dirac-Nijenhuis manifolds, and complex Dirac structures conclude the paper and illustrate our methods.