English

Symplectic reduction along a submanifold

Symplectic Geometry 2021-07-08 v1 Algebraic Geometry Differential Geometry Representation Theory

Abstract

We introduce the process of symplectic reduction along a submanifold as a uniform approach to taking quotients in symplectic geometry. This construction holds in the categories of smooth manifolds, complex analytic spaces, and complex algebraic varieties, and has an interpretation in terms of derived stacks in shifted symplectic geometry. It also encompasses Marsden--Weinstein--Meyer reduction, Mikami--Weinstein reduction, the pre-images of Poisson transversals under moment maps, symplectic cutting, symplectic implosion, and the Ginzburg--Kazhdan construction of Moore--Tachikawa varieties in TQFT. A key feature of our construction is a concrete and systematic association of a Hamiltonian GG-space MG,S\mathfrak{M}_{G, S} to each pair (G,S)(G,S), where GG is any Lie group and SLie(G)S\subseteq\mathrm{Lie}(G)^* is any submanifold satisfying certain non-degeneracy conditions. The spaces MG,S\mathfrak{M}_{G, S} satisfy a universal property for symplectic reduction which generalizes that of the universal imploded cross-section. While these Hamiltonian GG-spaces are explicit and natural from a Lie-theoretic perspective, some of them appear to be new.

Keywords

Cite

@article{arxiv.2107.03198,
  title  = {Symplectic reduction along a submanifold},
  author = {Peter Crooks and Maxence Mayrand},
  journal= {arXiv preprint arXiv:2107.03198},
  year   = {2021}
}

Comments

53 pages

R2 v1 2026-06-24T03:57:54.985Z