| Lecturer | 임선희 |
|---|---|
| Dept. | 서울대 |
| date | Sep 10, 2009 |
Volume entropy of a compact manifold is the exponential growth rate of balls in the universal cover. This seemingly coarse invariant contains a lot of geometric information of the manifold. We will discuss some relations to other invariants, some rigidity theorems in the manifold case. We will then introduce buildings and the volume entropy of buildings. The second part of the talk is a joint work with Francois Ledrappier.
Zeros of linear combinations of zeta functions
Counting circles in Apollonian circle packings and beyond
Sheaf quantization of Hamiltonian isotopies and non-displacability problems
Limit computations in algebraic geometry and their complexity
학부생을 위한 강연: Introduction to partial differential equations
Symmetry Breaking in Quasi-1D Coulomb Systems
Partial differential equations with applications to biology
학부생을 위한 강연: A COMBINATORIAL FORMULA FOR INFORMATION FLOW IN A NETWORK
Gaussian free field and conformal field theory
Hamiltonian dynamics, Floer theory and symplectic topology
Global result for multiple positive radial solutions of p-Laplacian system on exterior domain
Seoul ICM 2014 유치과정 개요 및 준비전략
Averaging formula for Nielsen numbers
Structures of Formal Proofs
Contact Homology and Constructions of Contact Manifolds
Unprojection
Volume entropy of hyperbolic buildings
