Applied partial differential equations

This new edition, interspersed with numerous footnotes and topical exercises, is aimed at students of mathematics, engineering and physics seeking a comprehensive text in the applications of PDEs.

• Introduction
• First-order scalar quasilinear equations
• First-order quasilinear systems
• Introduction to second-order scalar equations
• Hyperbolic equations
• Elliptic equations
• Parabolic equations
• Free boundary problems
• Non-quasilinear equations
• Miscellaneous topics
• Conclusion
• References
• Index

Partial differential equations are a central concept in mathematics. They are used in mathematical models of a huge range of real-world phenomena, from electromagnetism to financial markets. This new edition of the well-known text by Ockendon et al., providing an enthusiastic and clear guide to the theory and applications of PDEs, provides timely updates on: transform methods (especially multidimensional Fourier transforms and the Radon transform); explicit representations of general solutions of the wave equation; bifurcations; the Wiener-Hopf method; free surface flows; American options; the Monge-Ampere equation; linear elasticity and complex characteristics; as well as numerous topical exercises. This book is ideal for students of mathematics, engineering and physics seeking a comprehensive text in the modern applications of PDEs

• Introduction
• First-order scalar quasilinear equations
• First-order quasilinear systems
• Introduction to second-order scalar equations
• Hyperbolic equations
• Elliptic equations
• Parabolic equations
• Free boundary problems
• Non-quasilinear equations
• Miscellaneous topics
• Conclusion
• References
• Index