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Geomathematically Oriented Potential Theory

Willi Freeden | Christian Gerhards
€248.00
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A01=Christian Gerhards
A01=Willi Freeden
advanced field modeling
Author_Christian Gerhards
Author_Willi Freeden
boundary value problems
Category=PBKJ
Category=PHVG
eq_bestseller
eq_isMigrated=1
eq_nobargain
eq_non-fiction
eq_science
mathematical geophysics
multiscale gravitational field techniques
physical geodesy methods
spatial harmonic analysis
spherical data analysis

Product details

  • ISBN 9781439895429
  • Weight: 1030g
  • Dimensions: 156 x 234mm
  • Publication Date: 30 Oct 2012
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
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Description

As the Earth`s surface deviates from its spherical shape by less than 0.4 percent of its radius and today’s satellite missions collect their gravitational and magnetic data on nearly spherical orbits, sphere-oriented mathematical methods and tools play important roles in studying the Earth’s gravitational and magnetic field.

Geomathematically Oriented Potential Theory presents the principles of space and surface potential theory involving Euclidean and spherical concepts. The authors offer new insight on how to mathematically handle gravitation and geomagnetism for the relevant observables and how to solve the resulting potential problems in a systematic, mathematically rigorous framework.

The book begins with notational material and the necessary mathematical background. The authors then build the foundation of potential theory in three-dimensional Euclidean space and its application to gravitation and geomagnetism. They also discuss surface potential theory on the unit sphere along with corresponding applications.

Focusing on the state of the art, this book breaks new geomathematical grounds in gravitation and geomagnetism. It explores modern sphere-oriented potential theoretic methods as well as classical space potential theory.
About Christian Gerhards | Willi Freeden

Willi Freeden is a professor in the Geomathematics Group at the University of Kaiserslautern. Dr. Freeden is an editorial board member of seven international journals and was previously the editor-in-chief of the International Journal on Geomathematics. His research interests include special functions of mathematical (geo)physics, PDEs, constructive approximation, integral transforms, numerical methods, the use of mathematics in industry, and inverse problems in geophysics, geodesy, and satellite technology.

Christian Gerhards is a visiting postdoc researcher in the Department of Mathematics and Statistics at the University of New South Wales.

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