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Extra Form
강연자 이지운
소속 KAIST
date 2011-05-19

Since Bose and Einstein discovered the condensation of Bose gas, which we now call Bose-Einstein condensation, its mathematical properties have been of great importance for mathematical physics. Recently, many rigorous results have been obtained, mostly about its ground state energy and its dynamics in various models. In this talk, mathematical frameworks to study Bose gas will be introduced. Heuristics arguments and proofs to understand the properties of Bose gas will also be explained.

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첨부 '1'
  1. 극소곡면의 등주부등식

  2. Topology of configuration spaces on graphs

  3. 학부생을 위한 강연회: What is the algebraic number theory?

  4. 정년퇴임 기념강연회: 숙제

  5. Integer partitions, q-series, and Modular forms

  6. Root multiplicities of hyperbolic Kac-Moody algebras and Fourier coefficients of modular forms

  7. 학부생을 위한 강연: 브라질과 프랑스는 왜 축구를 잘 할까? - 경제와 수학과 축구와 법률

  8. A new view of Fokker-Planck equations in finite and Infinite dimensional spaces

  9. 원의 유리매개화에 관련된 수학

  10. Introduction to Non-Positively Curved Groups

  11. Noncommutative Geometry. Quantum Space-Time and Diffeomorphism Invariant Geometry

  12. 행렬함수 Permanent의 극소값 결정과 미해결 문제들

  13. 07Nov
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    in 수학강연회

    The Mathematics of the Bose Gas and its Condensation

  14. Codimension Three Conjecture

  15. 학부생을 위한 강연: 건축과 수학

  16. Classical and Quantum Probability Theory

  17. Iwasawa main conjecture and p-adic L-functions

  18. 학부생을 위한 강연: Choi's orthogonal Latin Squares is at least 61 years earlier than Euler's

  19. 젊은과학자상 수상기념강연: From particle to kinetic and hydrodynamic descriptions to flocking and synchronization

  20. Sums of squares in quadratic number rings

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