© 2014

Menahem Max Schiffer: Selected Papers Volume 2

  • Peter Duren
  • Lawrence Zalcman

Part of the Contemporary Mathematicians book series (CM)

Table of contents

  1. Front Matter
    Pages i-xiv
  2. Peter Duren, Lawrence Zalcman
    Pages 1-40
  3. Peter Duren, Lawrence Zalcman
    Pages 41-100
  4. Peter Duren, Lawrence Zalcman
    Pages 101-123

About this book


M. M. Schiffer, the dominant figure in geometric function theory in the second half of the twentieth century, was a mathematician of exceptional breadth, whose work ranged over such areas as univalent functions, conformal mapping, Riemann surfaces, partial differential equations, potential theory, fluid dynamics, and the theory of relativity. He is best remembered for the powerful variational methods he developed and applied to extremal problems in a wide variety of scientific fields.


Spanning seven decades, the papers collected in these two volumes represent some of Schiffer's most enduring innovations. Expert commentaries provide valuable background and survey subsequent developments. Also included are a complete bibliography and several appreciations of Schiffer's influence by collaborators and other admirers.




Conformal Mappings Extremal Green's Function Variations analysis dkcurrent representations

Editors and affiliations

  • Peter Duren
    • 1
  • Lawrence Zalcman
    • 2
  1. 1.Department of MathematicsUniversity of MichiganAnn ArborUSA
  2. 2.Department of MathematicsBar-Ilan UniversityRamat-GanIsrael

Bibliographic information

Industry Sectors
Finance, Business & Banking