I will explain the basic concepts of moduli and how moduli spaces can be constructed in algebraic geometry. Exploring the moduli spaces and issues arising from their construction lead to interesting interplay of geometry, algebra and computation.
| 강연자 | 현동훈 |
|---|---|
| 소속 | 서울대 |
| date | 2015-03-12 |
I will explain the basic concepts of moduli and how moduli spaces can be constructed in algebraic geometry. Exploring the moduli spaces and issues arising from their construction lead to interesting interplay of geometry, algebra and computation.
Hybrid discontinuous Galerkin methods in computational science and engineering
How to solve linear systems in practice
High dimensional nonlinear dynamics
Heavy-tailed large deviations and deep learning's generalization mystery
Hamiltonian dynamics, Floer theory and symplectic topology
Gromov-Witten-Floer theory and Lagrangian intersections in symplectic topology
Green’s function for initial-boundary value problem
Global result for multiple positive radial solutions of p-Laplacian system on exterior domain
Geometry, algebra and computation in moduli theory
Geometric structures and representation spaces
Geometric Langlands theory: A bridge between number theory and physics
Generalized multiscale HDG (hybridizable discontinuous Galerkin) methods for flows in highly heterogeneous porous media
Gaussian free field and conformal field theory
From mirror symmetry to enumerative geometry
Freudenthal medal, Klein medal 수상자의 수학교육이론
Free boundary problems arising from mathematical finance
Fixed points of symplectic/Hamiltonian circle actions
Fermat´s last theorem
Fefferman's program and Green functions in conformal geometry
Fano manifolds of Calabi-Yau Type
