This self-contained text/reference provides a basic foundation for practitioners, researchers, and students interested in any of the diverse areas of multiscale (geo)potential theory. New mathematical methods are developed enabling the gravitational potential of a planetary body to be modeled using a continuous flow of observations from land or satellite devices. Harmonic wavelets methods are introduced, as well as fast computational schemes and various numerical test examples. Presented are multiscale approaches for numerous geoscientific problems, including geoidal determination, magnetic field reconstruction, deformation analysis, and density variation modelling

With exercises at the end of each chapter, the book may be used as a textbook for graduate-level courses in geomathematics, applied mathematics, and geophysics. The work is also an up-to-date reference text for geoscientists, applied mathematicians, and engineers.

New mathematical methods are developed enabling the gravitational potential of a planetary body (the Earth) to be modeled and analyzed using a continuous flow of observations from land or satellite devices Comprehensive coverage of topics which, thus far, are only scattered in journal articles and conference proceedings Important applications and developments for future satellite scenarios; new modelling techniques involving low-orbiting satellites Multiscale approaches for numerous geoscientific problems, including geoidal determination, magnetic field reconstruction, deformation analysis, and density variation modelling Exercises at the end of each chapter and an appendix with hints to their solutions Accessible to a broad audience of grad students, geoscientists, applied mathematicians, and engineers Includes supplementary material: sn.pub/extras

Autorentext

Willi Freeden: Studies in mathematics, geography, and philosophy at the RWTH Aachen, 1971 Diplom in mathematics, 1972 Staatsexamen in mathematics and geography, 1975 PhD in mathematics, 1979 Habilitation in mathematics, 1981/1982 visiting research professor at The Ohio State University, Columbus (Department of Geodetic Science and Surveying), 1984 professor of mathematics at the RWTH Aachen (Institute of Pure and Applied Mathematics), 1989 professor of technomathematics (industrial mathematics), 1994 head of the Geomathematics Group, 2002-2006 vice-president for Research and Technology at the University of Kaiserslautern, 2009 editor in chief of the International Journal on Geomathematics (GEM), 2010 editor of the Handbook of Geomathematics, member of the editorial board of seven international journals. Martin Gutting: Studies in mathematics at the University of Kaiserslautern, 2003 Diplom in mathematics, focus on geomathematics , 2007 PhD in mathematics, postdoc researcherat the University of Kaiserslautern, lecturer in the course of geomathematics (in particular for constructive approximation, special functions, and inverse problems), 2011 lecturer for engineering mathematics at the University of Kaiserslautern and DHBW Mannheim.

Klappentext

This self-contained text/reference provides a basic foundation for practitioners, researchers, and students interested in any of the diverse areas of multiscale (geo)potential theory. New mathematical methods are developed enabling the gravitational potential of a planetary body to be modeled using a continuous flow of observations from land or satellite devices. Harmonic wavelets methods are introduced, as well as fast computational schemes and various numerical test examples. Presented are multiscale approaches for numerous geoscientific problems, including geoidal determination, magnetic field reconstruction, deformation analysis, and density variation modelling With exercises at the end of each chapter, the book may be used as a textbook for graduate-level courses in geomathematics, applied mathematics, and geophysics. The work is also an up-to-date reference text for geoscientists, applied mathematicians, and engineers.

Inhalt
1 Introduction.- 2 Preliminary Tools.- 2.1 Basic Settings.- 2.2 Spherical Nomenclature.- 2.3 Sphere Oriented Potential Theory.- 2.4 Exercises.- I Well-Posed Problems.- 3 Boundary-Value Problems of Potential Theory.- 4 Boundary-Value Problems of Elasticity.- II Ill-Posed Problems.- 5 Satellite Problems.- 6 The Gravimetry Problem.- 7 Conclusion.- 8 Hints for the Solution of the Exercises.- References.