On the geometric P=W conjecture | GRASP seminar

Time：2024-05-08 Wed 15:30-16:30

Venue：A3-2-303 Zoom:242 742 6089 BIMSA

Organizer：Pengfei Huang, Tao Su, Hao Sun

Speaker：Mirko Mauri cole Polytechnique

Abstract

The geometric P=W conjecture is a conjectural description of the asymptotic behaviour of acelebrated correspondence in non-abelian Hodge theory. in a joint work with Enrica Mazzon andMatthew Stevenson, we establish the full geometric conjecture for compact Riemann surfaces ofgenus one, and obtain partial results in arbitrary genus: this is the first non-trivial evidence of theconiecture for compact Riemann surfaces. To this end, we employ non-Archimedean, birational anddegeneration techniques to study the topology of the dual boundary complex of certain charactervarieties.

DATEMay 7, 2024

Related News

0
The P=W conjecture and Fourier transform | GRASP seminar
AbstractAround 2008, de Cataldo, Hausel, and Migliorini proposed the P=W conjecture, which predicts aconnection between the topology of the Hitchin system and the Hodge theory of the charactervariety under the non-abelian Hodge correspondence. Since then, much effort has been devoted tounderstanding this myterious phenomenon, leading to the discovery of new geometric structures onboth the Higgs...
1
Simpson's correspondence and the P=W conjecture
Abstract：For a complex projective curve C and a reductive group G, the character variety M_B and the moduli of Higgs bundles M_Dol are canonically homeomorphic via the Simpson's correspondence and hence the cohomology groups of them are naturally identified. The geometric structures of the moduli spaces induce various filtrations in the cohomology groups. De Cataldo-Hausel-Migliorini conjectur...