Geomathematics Group:

 
language:GER/ENG

PhD-Theses  

  1. M. Schreiner (1994) Tensor Spherical Harmonics and Their Application in Satellite Gradiometry.
    Referenten: W. Freeden (TU Kaiserslautern), R. Rummel (München).
  2. J. Cui (1995) Finite Pointset Methods on the Sphere and Their Application in Physical Geodesy.
    Referenten: W. Freeden (TU Kaiserslautern), H. Sünkel (Graz).
  3. U. Windheuser (1995) Sphärische Wavelets: Theorie und Anwendungen in der Physikalischen Geodäsie.
    Referenten: W. Freeden (TU Kaiserslautern), P. Maa� (Potsdam).
  4. M. Tücks (1996) Navier-Splines und ihre Anwendung in der Deformationanalyse.
    Referenten: W. Freeden (TU Kaiserslautern), E. Groten (Darmstadt), S.L. Svensson (Lund).
  5. F. Schneider (1997) Inverse Problems in Satellite Geodesy and Their Approximate Solution by Splines and Wavelets.
    Referenten: W. Freeden (TU Kaiserslautern), E. Schock (TU Kaiserslautern).
  6. V. Michel (1999) A Multiscale Method for the Gravimetry Problem: Theoretical and Numerical Aspects of Harmonic and Anharmonic Modelling:
    Referenten: W. Freeden (Kaiserlautern), E. Groten (Darmstadt) , E. Schock (TU Kaiserslautern).
  7. M. Bayer (1999) Geomagnetic Field Modelling From Satellite Data by First and Second Generation Wavelets.
    Referenten: W. Freeden (TU Kaiserslautern), H. L�hr (Potsdam), S.L. Svensson (Lund).
  8. S. Beth (2000) Multiscale Approximation by Vector Radial Basis Functions on the Sphere.
    Referenten: W. Freeden (TU Kaiserslautern), J. Mason (Huddersfield), B. Witte (Bonn).
  9. O. Glockner (2001) On Numerical Aspects of Gravitational Field Modelling from SST and SGG by Harmonic Splines and Wavelets (With Application to CHAMP Data).
    Referenten: W. Freeden (TU Kaiserslautern), J. Kusche (Delft), H. S�nkel (Graz).
  10. H. Nutz (2001) A Unified Setup of Gravitational Field Observables.
    Referenten: W. Freeden (TU Kaiserslautern), J. Prestin (L�beck), R. Rummel (M�nchen).
  11. R. Litzenberger (2001) Pyramid Schemes for Harmonic Wavelets in Boundary--Value Problems.
    Referenten: W. Freeden (TU Kaiserslautern), E. Schock (TU Kaiserslautern).
  12. T. Maier (2002) Multiscale Geomagnetic Field Modelling From Satellite Data: Theoretical Aspects and Numerical Applications.
    Referenten: W. Freeden (TU Kaiserslautern), N. Olsen (DSRI, Copenhagen).
  13. K. Hesse (2003) Domain Decomposition Methods in Multiscale Geopotential Determination from SST and SGG.
    Referenten: W. Freeden (TU Kaiserslautern), E. Groten (Darmstadt), I. Sloan (Sydney).
  14. M.K. Abeyratne (2003) Cauchy-Navier Wavelet Solvers and Their Application in Deformation Analysis.
    Referenten: W. Freeden (TU Kaiserslautern), E. Groten (Darmstadt).
  15. C. Mayer (2003) Wavelet Modelling of Ionospheric Currents and Induced Magnetic Fields From Satellite Data.
    Referenten: W. Freeden (TU Kaiserslautern), H. L�hr (Potsdam).
  16. F. Bauer (2004) An Alternative Approach to the Oblique Derivative Problem in Potential Theory.
    Referenten: W. Freeden (TU Kaiserslautern), S. Pereverzev (Linz).
  17. M. J. Fengler (2005) Vector Spherical Harmonic and Vector Wavelet Based Non-Linear Galerkin Schemes for Solving the Incompressible Navier-Stokes Equation on the Sphere.
    Referenten: W. Freeden (TU Kaiserslautern), T. Sonar (Braunschweig).
  18. D. Michel (2006) Framelet Based Multiscale Operator Decomposition.
    Referenten: Prof. Dr. Peter Maa� (Bremen) and HDoz. Dr. V. Michel (TU Kaiserslautern).
  19. A. Amirbekyan (submitted 2006, accepted 2007) The Application of Reproducing Kernel Based Spline Approximation to Seismic Surface and Body Wave Tomography: Theoretical Aspects and Numerical Results.
    Referenten: Prof. Dr. Frederik J. Simons (Princeton) and HDoz. Dr. V. Michel (TU Kaiserslautern).
  20. S. Gramsch (2006) Integralformeln und Wavelets auf regulären Gebieten der Sphäre.
    Referenten: W. Freeden (Kaiserslautern), M. Schreiner (Buchs)
  21. A. Luther (2007) Vector Field Approximation on Regular Surfaces in Terms of Outer Harmonic Representations.
    Referenten: W. Freeden (Kaiserslautern), G. Schüler (Kaiserslautern)
  22. Martin Gutting (2007) Fast Multipole Methods for Oblique Derivative Problems.
    Referenten: W. Freeden (TU Kaiserslautern), O.Steinbach.
  23. Ali Moghiseh (2007) Fast Wavelet Transform by Biorthogonal Locally Supported Radial Bases Functions on Fixed Spherical Grids.
    Referenten: W. Freeden (TU Kaiserslautern), M. Schreiner (Buchs).
  24. O. Schulte (2009) Euler Summation Oriented Spline Interpolation.
    Referenten: W. Freeden (TU Kaiserslautern), E.W. Grafarend (Stuttgart).
  25. T. Fehlinger (2009) Multiscale Formulations for the Disturbing Potential and the Deflections of the Vertical in Locally Reflected Physical Geodesy
    Referenten: W. Freeden (TU Kaiserslautern), P. Holota (Prag).
  26. K. Wolf (2009) Multiscale Modeling of Classical Boundary Value Problems in Physical Geodesy by Locally Supported Wavelets.
    Referenten: W. Freeden (TU Kaiserslautern), R. Rummel (München).
  27. A. Kohlhaas (2010) Multisclae Methods on Regular Surfaces and their Application to Physical Geodesy.
    Referenten: W. Freeden (TU Kaiserslautern), E. Groten (Darmstadt).
  28. C. Gerhards (2011) Spherical Multiscale Methods in Terms of Locally Supported Wavelets: Theory and Application to Geomagnetic Modeling.
    Referenten: W. Freeden (TU Kaiserslautern), N. Olsen (Kopenhagen).
  29. I. Ostermann (2011) Modeling heat transport in deep geothermal systems by radial basis functions.
    Referenten: W. Freeden (TU Kaiserslautern), R. Helmig (Stuttgart).
  30. M. Ilyasov (2011) A Tree Algorithm for Helmholtz Potential Wavelets on Non-smooth Surfaces: Theoretical Background and Application to Seismic Data Processing.
    Referenten: W. Freeden (TU Kaiserslautern), M.M. Popov (St. Petersburg).
  31. E. Kotevska (2011) Real Earth Oriented Gravitational Potential Determination Referenten.
    Referenten: W. Freeden (TU Kaiserslautern), H. Schaeben (Freiberg).