The work of coifman and semmes on complex interpolation, several complex variables, and PDE’s

  • Richard Rochberg
Part of the Lecture Notes in Mathematics book series (LNM, volume 1302)


Banach Space Vector Bundle Product Space Duality Theorem Interpolation Space 
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  1. [A]
    M. F. Atiyah, Geometry of Yang-Mills fields, Fermi Lectures at Scu. Norm. Pisa, 1978, Scu. Norm. Pisa 1979.Google Scholar
  2. [EL]
    J. Eells and L. Lemaire, A Report on Harmonic Mappings, Bull. Lond. Math. Soc. 10 (1978) 1–68.CrossRefzbMATHMathSciNetGoogle Scholar
  3. [P]
    K. Pohllmeyer, On the Lagrangian Theory of Anti-Self-Dual Fields in Four-Dimensional Euclidean Space.Google Scholar
  4. [R]
    R. Rochberg, Interpolation of Banach Spaces and Negatively Curved Vector Bundles, Pac. J. Math 110 (1984), 355–376.CrossRefzbMATHMathSciNetGoogle Scholar
  5. [RW]
    R. Rochberg and Guido Weiss, Analytic Families of Banach Spaces and Some of Their Uses, Recent Progress in Fourier Analysis, I. Peral and J.-L. Rubio de Francia eds., North-Holland, Amsterdam, 1985, 173–202.Google Scholar
  6. [UY]
    K Uhlenbeck and S.T. Yau, On the Existence of Hermitian-Yang-Mills Connections in Stable Vector Bundles, preprint 1986.Google Scholar
  7. [Z]
    Z. Slodkowski, Presentation at International Conference on Potential Theory and Related Topics, U. of Toledo, July, 1986.Google Scholar

Copyright information

© Springer-Verlag 1988

Authors and Affiliations

  • Richard Rochberg
    • 1
  1. 1.Department of MathematicsWashington UniversitySt. LouisUSA

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