Water Waves

The Mathematical Theory with Applications

J. J. Stoker (New York University)

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English

Wiley-Interscience
10 January 1992

Mathematics; Fluid mechanics; Wave mechanics (vibration & acoustics); Limnology (freshwater); Mechanics of fluids; Sanitary & municipal engineering

Series: Wiley Classics Library

Offers an integrated account of the mathematical hypothesis of wave motion in liquids with a free surface, subjected to gravitational and other forces. Uses both potential and linear wave equation theories, together with applications such as the Laplace and Fourier transform methods, conformal mapping and complex variable techniques in general or integral equations, methods employing a Green's function. Coverage includes fundamental hydrodynamics, waves on sloping beaches, problems involving waves in shallow water, the motion of ships and much more.

By: J. J. Stoker (New York University)
Imprint: Wiley-Interscience
Country of Publication: United States
Edition: New edition
Dimensions: Height: 225mm, Width: 155mm, Spine: 30mm
Weight: 794g
ISBN: 9780471570349
ISBN 10: 0471570346
Series: Wiley Classics Library
Pages: 608
Publication Date: 10 January 1992
Audience: Professional and scholarly , Professional and scholarly , Undergraduate , Undergraduate
Format: Paperback
Publisher's Status: Active

Basic Hydrodynamics. The Two Basic Approximate Theories. WAVES SIMPLE HARMONIC IN THE TIME. Simple Harmonic Oscillations in Water of Constant Depth. Waves Maintained by Simple Harmonic Surface Pressure in Water ofUniform Depth: Forced Oscillations. Waves on Sloping Beaches and Past Obstacles. MOTIONS STARTING FROM REST: TRANSIENTS. Unsteady Motions. WAVES ON A RUNNING STREAM: SHIP WAVES. Two-Dimensional Waves on a Running Stream in Water of UniformDepth. Waves Caused by a Moving Pressure Point: Kelvin's Theory of theWave Pattern Created by a Moving Ship. The Motion of a Ship, as a Floating Rigid Body, in a Seaway. Long Waves in Shallow Water. Mathematical Hydraulics. Problems in Which Free Surface Conditions Are Satisfied Exactly:The Breaking of a Dam; Levi-Civita's Theory. Bibliography. Indexes.

James J Stoker was an American applied mathematician and engineer. He was director of the Courant Institute of Mathematical Sciences and is considered one of the founders of the institute, Courant and Friedrichs being the others. Stoker is known for his work in differential geometry and theory of water waves.