English

Motion groupoids and mapping class groupoids

Mathematical Physics 2023-09-07 v3 Strongly Correlated Electrons High Energy Physics - Theory Category Theory Geometric Topology math.MP

Abstract

Here M\underline{M} denotes a pair (M,A)(M,A) of a manifold and a subset (e.g. A=MA=\partial M or A=A=\emptyset). We construct for each M\underline{M} its motion groupoid MotM\mathrm{Mot}_{\underline{M}}, whose object set is the power set PM {\mathcal P} M of MM, and whose morphisms are certain equivalence classes of continuous flows of the `ambient space' MM, that fix AA, acting on PM{\mathcal P} M. These groupoids generalise the classical definition of a motion group associated to a manifold MM and a submanifold NN, which can be recovered by considering the automorphisms in MotM\mathrm{Mot}_{\underline{M}} of NPMN\in {\mathcal P} M. We also construct the mapping class groupoid MCGM\mathrm{MCG}_{\underline{M}} associated to a pair M\underline{M} with the same object class, whose morphisms are now equivalence classes of homeomorphisms of MM, that fix AA. We recover the classical definition of the mapping class group of a pair by taking automorphisms at the appropriate object. For each pair M\underline{M} we explicitly construct a functor F ⁣:MotMMCGM\mathsf{F}\colon \mathrm{Mot}_{\underline{M}} \to \mathrm{MCG}_{\underline{M}}, which is the identity on objects, and prove that this is full and faithful, and hence an isomorphism, if π0\pi_0 and π1\pi_1 of the appropriate space of self-homeomorphisms of MM are trivial. In particular, we have an isomorphism in the physically important case M=([0,1]n,[0,1]n)\underline{M}=([0,1]^n, \partial [0,1]^n), for any nNn\in \mathbb{N}. We show that the congruence relation used in the construction MotM\mathrm{Mot}_{\underline{M}} can be formulated entirely in terms of a level preserving isotopy relation on the trajectories of objects under flows -- worldlines (e.g. monotonic `tangles'). We examine several explicit examples of MotM\mathrm{Mot}_{\underline{M}} and MCGM\mathrm{MCG}_{\underline{M}} demonstrating the utility of the constructions.

Cite

@article{arxiv.2103.10377,
  title  = {Motion groupoids and mapping class groupoids},
  author = {Fiona Torzewska and João Faria Martins and Paul Purdon Martin},
  journal= {arXiv preprint arXiv:2103.10377},
  year   = {2023}
}

Comments

Version accepted for publication in CMP. 75 pages, 14 figures

R2 v1 2026-06-24T00:19:33.021Z