Joint IAS/Princeton/Montreal/Paris/Tel-Aviv Symplectic Geometry Zoominar

Hamiltonian classification and unlinkedness of fibres in cotangent bundles of Riemann surfaces

In a joint work with Laurent Côté we show the following result. Any Lagrangian plane in the cotangent bundle of an open Riemann surface which coincides with a cotangent fibre outside of some compact subset, is compactly supported Hamiltonian isotopic to that fibre. This result implies Hamiltonian unlinkedness for Lagrangian links in the cotangent bundle of a (possibly closed Riemann surface whose components are Hamiltonian isotopic to fibres.

Date & Time

September 04, 2020 | 9:15am – 10:45am

Location

Remote Access

Speakers

Georgios Dimitroglou Rizell

Affiliation

Uppsala University

Categories