| Lecturer | 백상훈 |
|---|---|
| Dept. | KAIST |
| date | Oct 30, 2014 |
The notion of essential dimension was introduced by Buhler and Reichstein in the late 90s. Roughly speaking, the essential dimension of an algebraic object is the minimal number of algebraically independent parameters one needs to define the object. In this talk, we introduce the notion of essential dimension of an algebraic structure and discuss its meaning with various examples. In particular, we explain some recent results on the essential dimension of central simple algebras.
Regularity of solutions of Hamilton-Jacobi equation on a domain
What is Weak KAM Theory?
정년퇴임 기념강연: 회고
<학부생을 위한 강연> 사색 정리를 포함하는 Hadwiger의 추측의 변형에 관하여
The classification of fusion categories and operator algebras
Green’s function for initial-boundary value problem
Mechanization of proof: from 4-Color theorem to compiler verification
On the distributions of partition ranks and cranks
Q-curvature in conformal geometry
Zeros of the derivatives of the Riemann zeta function
Geometry, algebra and computation in moduli theory
Gromov-Witten-Floer theory and Lagrangian intersections in symplectic topology
High dimensional nonlinear dynamics
What is model theory?
Essential dimension of simple algebras
Restriction theorems for real and complex curves
Recommendation system and matrix completion: SVD and its applications (학부생을 위한 강연)
Deformation spaces of Kleinian groups and beyond
Idempotents and topologies
Recent progress on the Brascamp-Lieb inequality and applications
