| 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.
Conformal field theory in mathematics
Congruences between modular forms
Connectedness of a zero-level set as a geometric estimate for parabolic PDEs
Connes's Embedding Conjecture and its equivalent
Conservation laws and differential geometry
Contact Homology and Constructions of Contact Manifolds
Contact instantons and entanglement of Legendrian links
Contact topology of singularities and symplectic fillings
Convex and non-convex optimization methods in image processing
Counting circles in Apollonian circle packings and beyond
Counting number fields and its applications
Creation of concepts for prediction models and quantitative trading
Deformation spaces of Kleinian groups and beyond
Descent in derived algebraic geometry
Diophantine equations and moduli spaces with nonlinear symmetry
Elliptic equations with singular drifts in critical spaces
Entropies on covers of compact manifolds
Entropy of symplectic automorphisms
Equations defining algebraic curves and their tangent and secant varieties
Essential dimension of simple algebras
