Synopses & Reviews
Composite materials are widely used in industry and include such well known examples as superconductors and optical fibers. However, modeling these materials is difficult, since they often has different properties at different points. The mathematical theory of homogenization is designed to handle this problem. The theory uses an idealized homogenous material to model a real composite while taking into account the microscopic structure. This introduction to homogenization theory develops the natural framework of the theory with four chapters on variational methods for partial differential equations. It then discusses the homogenization of several kinds of second-order boundary value problems. It devotes separate chapters to the classical examples of stead and non-steady heat equations, the wave equation, and the linearized system of elasticity. It includes numerous illustrations and examples.
Description
Includes bibliographical references (p. [252]-257) and index.
Table of Contents
Preface
Variations on an Original Theme, Op. 36
Symphony No. 1 in A flat, Op. 55
Symphony No. 2 in E flat, Op. 63
Violin Concerto in B minor, Op. 61
Cello Concerto in E minor, Op. 85
Concert Overture Froissart, Op. 19
Serenade for Strings in E minor, Op. 20
Overture, Cockaigne (In London Town), Op. 40
Introduction and Allegro for String Quartet and String Orchestra, Op. 47
Concert-Overture In the South (Alassio), Op. 50
Falstaff - Symphonic-Study, Op. 68
Sea Pictures, A Cycle of Five Songs for Contralto, Op.37
The Music Makers, for Contralto Solo, Chorus, and Orchestra, Op. 69
The Dream of Gerontius, Op. 38
Index