Partial Differential Equations for Geometric Design

✍ Scribed by Hassan Ugail (auth.)

Publisher: Springer-Verlag London
Year: 2011
Tongue: English
Leaves: 118
Edition: 1
Category: Library

No coin nor oath required. For personal study only.

✦ Synopsis

The subject of Partial Differential Equations (PDEs) which first emerged in the 18th century holds an exciting and special position in the applications relating to the mathematical modelling of physical phenomena. The subject of PDEs has been developed by major names in applied mathematics such as Euler, Legendre, Laplace and Fourier and has applications to each and every physical phenomenon known to us e.g. fluid flow, elasticity, electricity and magnetism, weather forecasting and financial modelling.

This book introduces the recent developments of PDEs in the field of geometric design particularly for computer based design and analysis involving the geometry of physical objects. Starting from the basic theory through to the discussion of practical applications the book describes how PDEs can be used in the area of Computer Aided Design and Simulation Based Design. Extensive examples with real life applications of PDEs in the area of geometric design are discussed in the book.

✦ Table of Contents

Front Matter....Pages I-IX
Elementary Mathematics for Geometric Design....Pages 1-7
Introduction to Geometric Design....Pages 9-20
Introduction to Partial Differential Equations....Pages 21-30
Elliptic PDEs for Geometric Design....Pages 31-45
Interactive Design....Pages 47-60
Parametric Design....Pages 61-69
Functional Design....Pages 71-85
Other Applications....Pages 87-99
Conclusions....Pages 101-102
Back Matter....Pages 103-107

✦ Subjects

Math Applications in Computer Science

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