| Lecturer | 폴정 |
|---|---|
| Dept. | 카이스트 |
| date | Mar 25, 2021 |
Coulomb Gases are point processes consisting of particles whose pair interaction is governed by the Coulomb potential. There is also an external potential which confines the particles to a region. Wigner introduced this toy model for the Gibbs states of electrons in a crystal, and in the 1950s, connections with random matrix theory were established. In this talk we will discuss edge statistics of one and two dimensional Coulomb gases.
Regularity of solutions of Hamilton-Jacobi equation on a domain
Regularity for non-uniformly elliptic problems
Recommendation system and matrix completion: SVD and its applications (학부생을 위한 강연)
Recent progress on the Brascamp-Lieb inequality and applications
Randomness of prime numbers
Random walks in spaces of negative curvature
Random matrices and operator algebras
Random conformal geometry of Coulomb gas formalism
Queer Lie Superalgebras
Quasi-homomorphisms into non-commutative groups
Quantum Dynamics in the Mean-Field and Semiclassical Regime
Quantitative residual non-vanishing of special values of various L-functions
Q-curvature in conformal geometry
Persistent Homology
Periodic orbits in symplectic geometry
Partial differential equations with applications to biology
One and Two dimensional Coulomb Systems
On the Schauder theory for elliptic PDEs
On the resolution of the Gibbs phenomenon
On the distributions of partition ranks and cranks
