Special Session 69: New developments in symplectic dynamics

Lagrangian link quasimorphisms and the non-simplicity of Hameomorphism group of surfaces
Cheuk Yu Mak
University of Sheffield
England
Co-Author(s):    Daniel Cristofaro-Gardiner, Vincent Humiliere, Sobhan Seyfaddini, Ivan Smith and Ibrahim Trifa
Abstract:
In this talk, we will explain the construction of a sequence of homogeneous quasi-morphisms of the area-preserving homeomorphism group of the sphere using Lagrangian Floer theory for links. This sequence of quasi-morphisms has asymptotically vanishing defects, so it is asymptotically a homomorphism. It enables us to show that the Hameomorphism group is not the smallest normal subgroup of the area-preserving homeomorphism group. If time permits, we will explain how to generalize it to all positive genus surfaces even though we no longer have quasi-morphisms. The case of the sphere is joint work with Daniel Cristofaro-Gardiner, Vincent Humiliere, Sobhan Seyfaddini, and Ivan Smith. The case of positive genus surfaces is joint work with Ibrahim Trifa.