Topology Seminar @ Johns Hopkins University

Title
Configuration spaces of surfaces
Event
Topology Seminar
Location
Johns Hopkins University
On
Event
https://jhu-top-seminar.github.io/
Slides
https://onedrive.live.com/embed?cid=98107CE77FEFCA7B&resid=98107CE77FEFCA7B%2196166&authkey=AMvqRHTih-iYH4g&em=2&wdAr=1.7777777777777777

Abstract

Framed configuration spaces of a surface form a right module over the framed little disks operad. This rich algebraic structure has important consequences, for example for the computations of manifold calculus or factorization homology. Determining the homotopy type of this operadic right module remains however a difficult task. In this talk, I will explain how to compute the rational homotopy type for oriented compact surfaces. The result is a finite-dimensional purely combinatorial model. The proof involves several ingredients: Kontsevich’s formality, Tamarkin’s formality, and the cyclic formality of the framed little disks operad. (Joint work with Ricardo Campos and Thomas Willwacher.)