Advanced Topics in Applied Mathematics: For Engineering and the Physical Sciences

Hardback

Main Details

Title Advanced Topics in Applied Mathematics: For Engineering and the Physical Sciences
Authors and Contributors      By (author) Sudhakar Nair
Physical Properties
Format:Hardback
Pages:232
Dimensions(mm): Height 235,Width 158
Category/GenreApplied mathematics
Maths for engineers
ISBN/Barcode 9781107006201
ClassificationsDewey:620.00151
Audience
Tertiary Education (US: College)
Professional & Vocational
Illustrations Worked examples or Exercises; 33 Line drawings, unspecified

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 7 March 2011
Publication Country United Kingdom

Description

This book is ideal for engineering, physical science and applied mathematics students and professionals who want to enhance their mathematical knowledge. Advanced Topics in Applied Mathematics covers four essential applied mathematics topics: Green's functions, integral equations, Fourier transforms and Laplace transforms. Also included is a useful discussion of topics such as the Wiener-Hopf method, finite Hilbert transforms, the Cagniard-De Hoop method and the proper orthogonal decomposition. This book reflects Sudhakar Nair's long classroom experience and includes numerous examples of differential and integral equations from engineering and physics to illustrate the solution procedures. The text includes exercise sets at the end of each chapter and a solutions manual, which is available for instructors.

Author Biography

Sudhakar Nair is the Associate Dean for Academic Affairs of the Graduate College, Professor of Mechanical Engineering and Aerospace Engineering and Professor of Applied Mathematics at the Illinois Institute of Technology in Chicago. He is a Fellow of the ASME, an Associate Fellow of the AIAA and a member of the American Academy of Mechanics as well as Tau Beta Pi and Sigma Xi. Professor Nair is the author of numerous research articles and Introduction to Continuum Mechanics (2009).