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© 2019

Integral Methods in Science and Engineering

Analytic Treatment and Numerical Approximations

  • Christian Constanda
  • Paul Harris
Book

Table of contents

  1. Front Matter
    Pages i-xvi
  2. Mario Ahues, Filomena D. d’Almeida, Rosário Fernandes, Paulo B. Vasconcelos
    Pages 1-13
  3. María Anguiano, Renata Bunoiu
    Pages 15-24
  4. Amarisio S. Araújo, Helaine C. M. Furtado, Haroldo F. de Campos Velho
    Pages 25-35
  5. Laurent Baratchart, Juliette Leblond, Dmitry Ponomarev
    Pages 67-79
  6. Luana C. M. Cantagesso, Luara K. S. Sousa, Tamires A. Marotto, Anna M. Radovanovic, Adolfo Puime Pires, Alvaro M. M. Peres
    Pages 81-95
  7. Joel Fotso Tachago, Hubert Nnang, Elvira Zappale
    Pages 123-131
  8. Delfina Gómez, Santiago Navazo-Esteban, María-Eugenia Pérez-Martínez
    Pages 133-148
  9. Cibele A. Ladeia, Bardo E. J. Bodmann, Marco T. Vilhena
    Pages 197-210
  10. Paolo Luzzini, Paolo Musolino
    Pages 211-223

About this book

Introduction

This contributed volume contains a collection of articles on state-of-the-art developments on the construction of theoretical integral techniques and their application to specific problems in science and engineering. The chapters in this book are based on talks given at the Fifteenth International Conference on Integral Methods in Science and Engineering, held July 16-20, 2018 at the University of Brighton, UK, and are written by internationally recognized researchers. The topics addressed are wide ranging, and include:
  • Asymptotic analysis
  • Boundary-domain integral equations
  • Viscoplastic fluid flow
  • Stationary waves
  • Interior Neumann shape optimization
  • Self-configuring neural networks
This collection will be of interest to researchers in applied mathematics, physics, and mechanical and electrical engineering, as well as graduate students in these disciplines and other professionals for whom integration is an essential tool.

Keywords

Integral Equation Integro-Differential Equation Boundary Value Problems Wiener-Hopf Method Volterra Equation

Editors and affiliations

  • Christian Constanda
    • 1
  • Paul Harris
    • 2
  1. 1.Department of MathematicsThe University of TulsaTulsaUSA
  2. 2.Computing, Engineering, and MathematicsUniversity of BrightonBrightonUK

About the editors

Christian Constanda, PhD, is the Charles W. Oliphant Professor of Mathematics at The University of Tulsa, Oklahoma, USA

Paul Harris, PhD, is a professor at the School of Computing, Engineering & Maths at the University of Brighton

Bibliographic information