Topics in the Mathematical Modelling of Composite Materials

  • Andrej Cherkaev
  • Robert Kohn

Part of the Progress in Nonlinear Differential Equations and Their Applications book series (PNLDE, volume 31)

Table of contents

  1. Front Matter
    Pages i-xiv
  2. François Murat, Luc Tartar
    Pages 21-43
  3. Doina Cioranescu, François Murat
    Pages 45-93
  4. L. V. Gibiansky, A. V. Cherkaev
    Pages 95-137
  5. François Murat, Luc Tartar
    Pages 139-173
  6. Back Matter
    Pages 319-321

About this book


Andrej V. Cherkaev and Robert V. Kohn In the past twenty years we have witnessed a renaissance of theoretical work on the macroscopic behavior of microscopically heterogeneous mate­ rials. This activity brings together a number of related themes, including: ( 1) the use of weak convergence as a rigorous yet general language for the discussion of macroscopic behavior; (2) interest in new types of questions, particularly the "G-closure problem," motivated in large part by applications of optimal control theory to structural optimization; (3) the introduction of new methods for bounding effective moduli, including one based on "com­ pensated compactness"; and (4) the identification of deep links between the analysis of microstructures and the multidimensional calculus of variations. This work has implications for many physical problems involving optimal design, composite materials, and coherent phase transitions. As a result it has received attention and support from numerous scientific communities, including engineering, materials science, and physics as well as mathematics. There is by now an extensive literature in this area. But for various reasons certain fundamental papers were never properly published, circu­ lating instead as mimeographed notes or preprints. Other work appeared in poorly distributed conference proceedings volumes. Still other work was published in standard books or journals, but written in Russian or French. The net effect is a sort of "gap" in the literature, which has made the subject unnecessarily difficult for newcomers to penetrate.


Mathematica calculus differential equation equation mathematics modeling optimal control optimization partial differential equation

Editors and affiliations

  • Andrej Cherkaev
    • 1
  • Robert Kohn
    • 2
  1. 1.Department of MathematicsUniversity of UtahSalt Lake CityUSA
  2. 2.Courant Mathematical InstituteNew York UniversityNew YorkUSA

Bibliographic information

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