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Extra Form
Lecturer 권순식
Dept. KAIST
date May 01, 2014

Normal form method is a classical ODE technique begun by H. Poincare. Via a suitable transformation one reduce a differential equation to a simpler form, where most of nonresonant terms are cancelled. In this talk, I begin to explain the notion of resonance and the normal form method in ODE setting and Hamiltonian systems. Afterward, I will present how we apply the method to nonlinear dispersive equations such as KdV, NLS to obtain unconditional well-posedness for low regularity data.


Atachment
Attachment '1'
  1. Recommendation system and matrix completion: SVD and its applications (학부생을 위한 강연)

  2. Deformation spaces of Kleinian groups and beyond

  3. Idempotents and topologies

  4. Recent progress on the Brascamp-Lieb inequality and applications

  5. Existence of positive solutions for φ-Laplacian systems

  6. Riemann-Hilbert correspondence for irregular holonomic D-modules

  7. 08May
    by 김수현
    in Math Colloquia

    Normal form reduction for unconditional well-posedness of canonical dispersive equations

  8. Random conformal geometry of Coulomb gas formalism

  9. Categorification of Donaldson-Thomas invariants

  10. Noncommutative Surfaces

  11. The Shape of Data

  12. Topological aspects in the theory of aperiodic solids and tiling spaces

  13. Subgroups of Mapping Class Groups

  14. Analytic torsion and mirror symmetry

  15. Fefferman's program and Green functions in conformal geometry

  16. 정년퇴임 기념강연: Volume Conjecture

  17. Connes's Embedding Conjecture and its equivalent

  18. Connectedness of a zero-level set as a geometric estimate for parabolic PDEs

  19. Combinatorial Laplacians on Acyclic Complexes

  20. 학부생을 위한 ε 강연회: Mathematics from the theory of entanglement

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