Fresnel
Adaptive solution for Fresnel's equation
Adaptive solution for Fresnel's equation |
Short Description
We develope the space and time adaptive algorithms for the solution of Fresnel's equation based on Rothe's method.
Publications
- Solution of Interior-Exterior Helmholtz-Type Problems Based on the Pole Condition Concept: Theory and AlgorithmsFree University Berlin, Fachbereich Mathematik und Informatik Habilitation thesis (2002)
- Transparent Boundary Conditions for Split-Step Padé Approximations of the One-Way Helmholtz equationJ. Comp. Phys, Vol. 170, 696-719 (2001)
- Transparent boundary conditions for a wide-angle approximation of the one-way Helmholtz equationJ. Comput. Phys., Vol. 165 (2) , 645-659 (2000)
- Transparent Boundary Conditions for Wide Angle One-way Helmholtz equation(SC 99-45) ZIB Preprint -Appeared in J. Comp. Phys. 165 (2000) 645-659 (1999)
- Discrete Transparent Boundary Conditions for the Fresnel EquationIn: Proceedings of the 8th European Conference on Integrated Optics, 222-225, Royal Institute of Technology, Stockholm, Sweden (1997)
- On the Reference Wave Vector of Paraxial Helmholtz EquationsIEEE Journal of Lightwave Technology, Vol. 14, 2395-2400 (1996)
- Discrete Transparent Boundary Conditions for the Numerical Solution of Fresnel's Equation.Comput. Math. Appl., Vol. 29, 53-76 (1995)
- Discrete Transparent Boundary Conditions for Fresnel's EquationIn: Integrated Photonics Research, 45-47, San Francisco, California, USA (1994)
- Phase-adaptive basis functions for a multilevel finite element solution of the paraxial wave equationIn: Euro-Opto Series: Linear and Nonlinear Integrated Optics., G. C. Righini, D. Yevick (ed) , 57-61, Lindau, Germany (1994)
- An Adaptive Approach to the Numerical Solution of Fresnel's Wave Equation.IEEE Journal of Lightwave Technology, Vol. 11 (9) , 1425-1435 (1993)
- further information
Fresnel - 01.01.2000 00:00