Ezra Getzler: Cubical methods and higher Lie groupoids
Time: Wed 2024-10-23 10.00 - 12.00
Location: Albano house 1, floor 3, Room U (Kovalevsky)
Participating: Ezra Getzler
Abstract
We construct the higher Lie groupoid associated to a differential groupoid using the de Rham theorem for cubical sets. The de Rham theorem for cubical sets seems to have a lower degree of computational complexity compared to the de Rham theorem for simplicial sets - this is a key theme of this talk.
Using a result of Berglund (the homological perturbation lemma for dg Lie algebras), we construct a higher dimensional analogue of holonomy (path ordered exponential in the one-dimensional case), which seems to encompass all previous definitions.