Localization and flexibilization in symplectic geometry
Abstract
We introduce the critical Weinstein infinity-category -- the result of stabilizing the category of Weinstein sectors and inverting subcritical morphisms -- and for every finite collection P of integers, construct a P-flexibilization endofunctor. Our main result is that P-flexibilization is an idempotent localization functor of the critical Weinstein infinity-category, allowing us to characterize the essential image of the endofunctor by a universal property. This localization has the effect of replacing every Weinstein sector with one in which P is invertible in the wrapped Fukaya category and hence is a symplectic analogue of topological localization of Bousfield and Sullivan, answering a question of Abouzaid and Seidel. When P = {0}, our construction recovers Cieliebak and Eliashberg's flexibilization procedure. Moreover, we show that P-flexibilization is symmetric monoidal as a functor of higher categories, and hence gives rise to a new way of constructing E-infinity-commutative algebra objects from symplectic geometry.
Cite
@article{arxiv.2109.06069,
title = {Localization and flexibilization in symplectic geometry},
author = {Oleg Lazarev and Zachary Sylvan and Hiro Lee Tanaka},
journal= {arXiv preprint arXiv:2109.06069},
year = {2025}
}
Comments
Revised according to referee comments and changed some notation