| 강연자 | Gunnar E. Carlsson |
|---|---|
| 소속 | Stanford University |
| date | 2014-03-25 |
Homology is a method for assigning signatures to geometric objects which re ects the presence of various kinds of features, such as connected components, loops, spheres, surfaces, etc. within the object. Persistent homology is a methodology devised over the last 10-15 years which extend the methods of homology to samples from geometric objects, or point clouds. We will discuss homology in its idealized form, as well as persistent homology, with examples.
Hybrid discontinuous Galerkin methods in computational science and engineering
The phase retrieval problem
Theory and applications of partial differential equations
Analysis and computations of stochastic optimal control problems for stochastic PDEs
<학부생을 위한 ε 강연> 압축센싱과 행렬완성
<학부생을 위한 ε 강연> 수학과 예술 - 초기 컴퓨터 그래픽
Faithful representations of Chevalley groups over quotient rings of non-Archimedean local fields
Quasi-homomorphisms into non-commutative groups
Entropies on covers of compact manifolds
Iwahori-Hecke algebras and beyond
On the resolution of the Gibbs phenomenon
<학부생을 위한 ε 강연> What mathematics can do for the real and even fake world
The process of mathematical modelling for complex and stochastic biological systems
Random walks in spaces of negative curvature
Solver friendly finite element methods
Brownian motion and energy minimizing measure in negative curvature
학부생을위한ε강연: 수학자는 왜 선망되는 직업일까?
Generalized multiscale HDG (hybridizable discontinuous Galerkin) methods for flows in highly heterogeneous porous media
Weyl character formula and Kac-Wakimoto conjecture
Nonlocal generators of jump type Markov processes
