Concurring reduction schemes for Dirac structures
Abstract
The notion of \emph{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 \emph{Dirac reduction}, we prove that two concurring Dirac structures have concurring reductions whenever they share a common \emph{witness}, extending to Dirac geometry the reduction of the Marsden-Ra\cb{t}iu 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.
Cite
@article{arxiv.2604.26196,
title = {Concurring reduction schemes for Dirac structures},
author = {Dan Aguero and Alessandro Arsie and Pedro Frejlich and Igor Mencattini},
journal= {arXiv preprint arXiv:2604.26196},
year = {2026}
}
Comments
40 pages. Comments are welcome!