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강연자 Gunnar E. Carlsson
소속 Stanford University
date 2014-03-27

Creating information and knowledge from large and complex data sets is one the fundamental intellectual challenges currently being faced by the mathematical sciences. One approach to this problem comes from the mathematical subdiscipline called topology, which is the study of shape and of its higher dimensional analogues. This subject has thrived as a field within pure mathematics, but the last fifteen years has seen the development of topological methods for studying data sets, which are modeled as point clouds or finite metric spaces. I will survey this work, with examples.


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첨부 '1'
  1. Seoul ICM 2014 유치과정 개요 및 준비전략

  2. Sheaf quantization of Hamiltonian isotopies and non-displacability problems

  3. Solver friendly finite element methods

  4. Space.Time.Noise

  5. Spectral Analysis for the Anomalous Localized Resonance by Plasmonic Structures

  6. Structural stability of meandering-hyperbolic group actions

  7. Structures of Formal Proofs

  8. Study stochastic biochemical systems via their underlying network structures

  9. Subgroups of Mapping Class Groups

  10. Subword complexity, expansion of real numbers and irrationality exponents

  11. Sums of squares in quadratic number rings

  12. Survey on a geography of model theory

  13. Symmetry Breaking in Quasi-1D Coulomb Systems

  14. Symplectic Geometry, Mirror symmetry and Holomorphic Curves

  15. Symplectic topology and mirror symmetry of partial flag manifolds

  16. The classification of fusion categories and operator algebras

  17. The lace expansion in the past, present and future

  18. The Lagrange and Markov Spectra of Pythagorean triples

  19. The Mathematics of the Bose Gas and its Condensation

  20. The phase retrieval problem

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