http://rim.math.snu.ac.kr/board/files/attach/images/701/ff97c54e6e21a4ae39315f9a12b27314.png
Extra Form
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.

Atachment
Attachment '1'
  1. 2021-2 Rookies Pitch: Regularity for PDEs (수미야)

    CategoryBK21 FOUR Rookies Pitch Dept.서울대학교 Lecturer수미야
    Read More
  2. 2021-2 Rookies Pitch: Harmonic Analysis (이진봉)

    CategoryBK21 FOUR Rookies Pitch Dept.서울대학교 Lecturer이진봉
    Read More
  3. Random matrices and operator algebras

    Free probability is a young mathematical theory that started in the theory of operator algebras. One of the main features of free probability theory is its connection with random matrices. Indeed, free probability provides operator algebrai...
    CategoryMath Colloquia Dept.서울대학교 수학교육과 Lecturer윤상균
    Read More
  4. Symplectic topology and mirror symmetry of partial flag manifolds

    Soon after Gromov’s applications of pseudo-holomorphic curves to symplectic topology, Floer invented an infinite-dimensional Morse theory by analyzing moduli spaces of pseudo-holomorphic curves to make substantial progress on Arnold&r...
    CategoryMath Colloquia Dept.부산대학교 수학과 Lecturer김유식
    Read More
  5. 2021-2 Rookies Pitch: Number Theory (김지구)

    CategoryBK21 FOUR Rookies Pitch Dept.이화여자대학교 Lecturer김지구
    Read More
  6. 2021-2 Rookies Pitch: Arithmetic Statistics (이정인)

    CategoryBK21 FOUR Rookies Pitch Dept.KIAS Lecturer이정인
    Read More
  7. 돈은 어떻게 우리 삶에 돈며들었는가? (불확실성 시대에 부는 선형적으로 증가하는가?)

    1. 금본위제, 달러, 비트코인 등 돈의 흐름으로 보는 세계사 2. 사람은 어떻게 생각하고 행동하는가 ? (행동경제학, 비선형성) 3. 돈에 대한 생각, 행동, 습관을 바꾸어보자. (부자들은 무엇이 다른가 ? 지금부터 준비해보자.) 4. 주식, 부동산 등 자산관리 [...
    CategoryMath Colloquia Dept.농협은행 Lecturer홍순옥
    Read More
  8. <학부생을 위한 ɛ 강연> Mathematics and music: Pythagoras, Bach, Fibonacci and AI

    In this talk, I will introduce the audience to the original beauty that leads to exploring the mathematical elements in music. I will cover the following topics on the connection between music and mathematics. - Harmonics & equations - ...
    CategoryMath Colloquia Dept.피아니스트 Lecturer임현정
    Read More
  9. Topological surgery through singularity in mean curvature flow

    The mean curvature flow is an evolution of hypersurfaces satisfying a geometric heat equation. The flow naturally develops singularities and changes the topology of the hypersurfaces at singularities, Therefore, one can study topological pr...
    CategoryMath Colloquia Dept.고등과학원 Lecturer최경수
    Read More
  10. Heavy-tailed large deviations and deep learning's generalization mystery

    Abstract: While the typical behaviors of stochastic systems are often deceptively oblivious to the tail distributions of the underlying uncertainties, the ways rare events arise are vastly different depending on whether the underlying tail ...
    CategoryMath Colloquia Dept.Northwestern University Lecturer이창한
    Read More
  11. Diophantine equations and moduli spaces with nonlinear symmetry

    A fundamental result in number theory is that, under certain linear actions of arithmetic groups on homogeneous varieties, the integral points of the varieties decompose into finitely many orbits. For a classical example, the set of integra...
    CategoryMath Colloquia Dept.서울대학교 Lecturer황준호
    Read More
  12. <정년퇴임 기념강연> Hardy, Beurling, and invariant subspaces

    The invariant subspace problem is one of the longstanding open problem in the field of functional analysis and operator theory. It is due to J. von Neumann (in 1932) and is stated as: Does every operator have a nontrivial invariant subspace...
    CategoryMath Colloquia Dept.서울대학교 Lecturer이우영
    Read More
  13. <정년퇴임 기념강연> The Elements of Euclid

    The thirteen books "Elements" were written or collected by Euclid of Alexandria about 300 BCE. Many think that "Elements" is the most important example of deductive mathematics. In fact, the Common Notions and the Postulates of Elements are...
    CategoryMath Colloquia Dept.서울대/광주과학기술원 Lecturer김홍종
    Read More
  14. On circle diffeomorphism groups

    For each natural number k, the C^k diffeomorphisms of the circle form a group with function compositions. This definition even extends to real numbers k no less than one by Hölder continuity. We survey algebraic properties of this grou...
    CategoryMath Colloquia Dept.고등과학원 Lecturer김상현
    Read More
  15. <학부생을 위한 ɛ 강연> Symplectic geometry and the three-body problem

    We describe some of the history of the three-body problem and how it lead to symplectic geometry. We start by sketching Poincare’s prize-winning work, and discuss how it lead to the birth of the fields of dynamical systems and symplec...
    CategoryMath Colloquia Dept.서울대학교 LecturerOtto van Koert
    Read More
  16. WGAN with an Infinitely wide generator has no spurious stationary points

    Generative adversarial networks (GAN) are a widely used class of deep generative models, but their minimax training dynamics are not understood very well. In this work, we show that GANs with a 2-layer infinite-width generator and a 2-layer...
    CategoryMath Colloquia Dept.서울대학교 Lecturer류경석
    Read More
  17. Free boundary problems arising from mathematical finance

    Many problems in financial mathematics are closely related to the stochastic optimization problem because the optimal decision must be made under the uncertainty. In particular, optimal stopping, singular control, and optimal switching prob...
    CategoryMath Colloquia Dept.경희대학교 Lecturer전준기
    Read More
  18. One and Two dimensional Coulomb Systems

    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 Gi...
    CategoryMath Colloquia Dept.카이스트 Lecturer폴정
    Read More
  19. 2021-2 Rookies Pitch: Stochastic Analysis (이해성)

    CategoryBK21 FOUR Rookies Pitch Dept.서울대학교 수학연구소 Lecturer이해성
    Read More
  20. 2021-2 Rookies Pitch: Probability Theory (조수빈)

    CategoryBK21 FOUR Rookies Pitch Dept.서울대학교 수리과학부 Lecturer조수빈
    Read More
Board Pagination Prev 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 Next
/ 16