SubsidieMeestersCorrespondences in enumerative geometry: Hilbert schemes, K3 surfaces and modular forms
The project aims to establish new correspondences in enumerative geometry linking Gromov-Witten and Donaldson-Thomas theories, enhancing understanding of K3 surfaces and modular forms.
Projectdetails
Introduction
Enumerative geometry is concerned with counting geometric objects on spaces defined by polynomial equations. The subject, which has roots going back to the ancient Greeks, was revolutionized by string theory in the 90s and has since become a fundamental link between algebraic geometry, representation theory, number theory, and physics.
Project Proposal
With K3Mod, I propose to establish a wide range of new correspondences in enumerative geometry. These link together different enumerative theories and open new perspectives to attack long-standing problems concerning:
- The quantum cohomology of the Hilbert scheme of points on surfaces
- Modular properties of invariants of K3 surfaces
- String partition functions of Calabi-Yau threefolds with links to Conway Moonshine
- A major case of the Crepant Resolution Conjecture
Central Role of Hilbert Schemes
The geometry of the Hilbert scheme of points on a surface will play a central role. I aim to prove a correspondence between its Gromov-Witten theory and the Donaldson-Thomas theory of certain threefold families.
Additional Considerations
Correspondences for moduli spaces of Higgs bundles and the orbifold theory of the symmetric product of surfaces will be considered as well. This provides methods to prove that Gromov-Witten invariants of Hilbert schemes of points on K3 surfaces are Fourier coefficients of quasi-Jacobi forms, possibly leading to a complete solution of their enumerative geometry.
Focus on K3 Surfaces
After elliptic curves, K3 surfaces form the simplest Calabi-Yau geometry for which a complete understanding of the Gromov-Witten theory is in reach. For elliptic threefolds, I will study the relationship of their Donaldson-Thomas invariants with quasi-Jacobi forms, using both degeneration techniques and wall-crossing formulae.
Research Goals
The research goals of this proposal will lead to exciting new connections between geometry, modular forms, and representation theory. The results will provide a clear understanding of the interplay between Hilbert schemes, K3 surfaces, and modularity in enumerative geometry.
Financiële details & Tijdlijn
Financiële details
| Subsidiebedrag | € 1.429.135 |
| Totale projectbegroting | € 1.429.135 |
Tijdlijn
| Startdatum | 1-2-2023 |
| Einddatum | 31-1-2028 |
| Subsidiejaar | 2023 |
Partners & Locaties
Projectpartners
- RUPRECHT-KARLS-UNIVERSITAET HEIDELBERGpenvoerder
- KUNGLIGA TEKNISKA HOEGSKOLAN
Land(en)
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Surfaces on fourfolds
This project aims to explore and count surfaces and representations in 4-dimensional spaces, revealing new geometric properties and connections to the Hodge conjecture and singularity resolutions.
Modularity and Reciprocity: a Robust Approach
This project aims to enhance understanding of Galois representations in the Langlands programme through innovative techniques, addressing key conjectures in arithmetic geometry and automorphic forms.
Automorphic Forms and Arithmetic
This project seeks to advance number theory and automorphic forms by addressing three longstanding conjectures through an interdisciplinary approach combining analytic methods and automorphic machinery.
Geometric Analysis and Surface Groups
This project aims to explore the connections between curves in flag manifolds and moduli spaces of Anosov representations, focusing on energy functions, volumes, and topological invariants.
The Langlands Correspondence
This project explores the Langlands correspondence through Hecke algebras, extends it to rational functions on curves, and seeks a categorification to strengthen its foundational aspects.