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Higher-Order Numerical Methods for Transient Wave Equations
Gary Cohen
出版
Springer Science & Business Media
, 2013-04-17
主題
Science / Physics / Mathematical & Computational
Mathematics / Counting & Numeration
Science / Physics / Electricity
Science / Acoustics & Sound
Technology & Engineering / Engineering (General)
Science / Physics / General
Mathematics / Numerical Analysis
Science / Physics / Optics & Light
Science / Waves & Wave Mechanics
Mathematics / Applied
ISBN
366204823X
9783662048238
URL
http://books.google.com.hk/books?id=sPfvCAAAQBAJ&hl=&source=gbs_api
EBook
SAMPLE
註釋
Solving efficiently the wave equations involved in modeling acoustic, elastic or electromagnetic wave propagation remains a challenge both for research and industry. To attack the problems coming from the propagative character of the solution, the author constructs higher-order numerical methods to reduce the size of the meshes, and consequently the time and space stepping, dramatically improving storage and computing times. This book surveys higher-order finite difference methods and develops various mass-lumped finite (also called spectral) element methods for the transient wave equations, and presents the most efficient methods, respecting both accuracy and stability for each sort of problem. A central role is played by the notion of the dispersion relation for analyzing the methods. The last chapter is devoted to unbounded domains which are modeled using perfectly matched layer (PML) techniques. Numerical examples are given.