© 2011

Integral Methods in Science and Engineering

Computational and Analytic Aspects

  • Christian Constanda
  • Paul J. Harris

Table of contents

  1. Front Matter
    Pages I-XXV
  2. L. N. Burigo, D. Hadjimichef, B. E. J. Bodmann
    Pages 15-23
  3. D. Buske, M. T. Vilhena, C. F. Segatto, R. S. Quadros
    Pages 25-34
  4. D. Q. de Camargo, B. E. J. Bodmann, M. T. Vilhena, S. d. Q. B. Leite
    Pages 35-45
  5. H. F. de Campos Velho, H. C. Morais Furtado
    Pages 47-57
  6. I. Chudinovich, C. Constanda
    Pages 129-140
  7. C. Corduneanu
    Pages 141-146
  8. G. A. Curtiss, D. M. Leppinen, Q. X. Wang, J. R. Blake
    Pages 147-158
  9. D. Gómez, S. A. Nazarov, E. Pérez
    Pages 159-172
  10. H. Guebbaï, A. Largillier
    Pages 173-180

About this book


The systematic study of the physical world is largely based on the design of mathematical models using many different types of ordinary differential, partial differential, integral, and integro-differential equations. The solutions of these equations are therefore of great interest to practitioners and to science in general. With a wealth of cutting-edge research in the field, Integral Methods in Science and Engineering: Computational and Analytic Aspects provides a vivid picture of both the development of theoretical integral techniques and their use in specific science and engineering problems.

The volume is an outgrowth of talks presented by world-renowned researchers at the Eleventh International Conference on Integral Methods in Science and Engineering held in Brighton, UK, July 12–14, 2010. The array of topics they address is immense, ranging from theoretical advances in boundary integral methods to applications of analytic and numerical quadrature techniques as diverse as integral equations, finite and boundary elements, conservation laws, hybrid approaches, and more.

With ample coverage of theory and applications, this book will be a valuable resource for researchers in applied mathematics, physics, and mechanical and electrical engineering, for graduate students in these disciplines, and for various other professionals who use integration as an essential technique in their work.


boundary integral equations deformable solids fluid mechanics integral equations integral methods numerical analysis ordinary differential equations partial differential equations

Editors and affiliations

  • Christian Constanda
    • 1
  • Paul J. Harris
    • 2
  1. 1., Department of Mathematical and ComputerThe University of TulsaTulsaUSA
  2. 2.School of Computing, Engineering, and MaUniversity of BrightonBrightonUnited Kingdom

Bibliographic information