Enumerative Geometry in Scattering diagrams

Date/Time
9 May 2027 - 14 May 2027

Organized by
Michel van Garrel (U. of Birmingham), Cristina Manolache (U. of Sheffield), and Helge Ruddat (U. of Stavanger)

Event page & registration
https://indico.global/event/16542/

Description

Scattering diagrams have emerged as a powerful tool in mathematical physics and enumerative geometry, particularly in the context of mirror symmetry and tropical geometry. This workshop focuses on recent developments in using scattering diagrams to compute enumerative invariants, such as Gromov-Witten and Donaldson-Thomas invariants. Key topics include combinatorial descriptions of scattering diagrams, their relations to cluster algebras, positivity conjectures, and applications to log Calabi-Yau varieties and refined invariants. Recent advances, such as intrinsic enumerative mirror symmetry revisiting Takahashi’s log mirror conjecture for (P², E), highlight the role of scattering diagrams in period integrals and degeneration techniques. The event will explore connections between scattering diagrams, holomorphic discs, and tropical curve counts, highlighting their role in bridging algebraic and tropical geometries.

Schedule

Location
SwissMAP Research Station, Les Diablerets, Switzerland