Advanced search
2 files | 532.47 KB

The complex Jacobi iterative method for non-paraxial beam propagation in nonlinear optical waveguides

Khai Le Quang (UGent) and Peter Bienstman (UGent)
Author
Organization
Abstract
The recently introduced beam propagation method using complex Jacobi iteration adapted for modeling of non-paraxial beam propagation in nonlinear optical waveguides is presented in this paper. The beam propagation equation is based on our recently proposed modified Pad,(1,1) approximant operator. The resulting approach is very efficient and well-suited for large structures with long propagation paths.
Keywords
PADE APPROXIMANT OPERATORS

Downloads

  • (...).pdf
    • full text
    • |
    • UGent only
    • |
    • PDF
    • |
    • 248.33 KB
  • 4481 i.pdf
    • full text
    • |
    • open access
    • |
    • PDF
    • |
    • 284.14 KB

Citation

Please use this url to cite or link to this publication:

Chicago
Le Quang, Khai, and Peter Bienstman. 2009. “The Complex Jacobi Iterative Method for Non-paraxial Beam Propagation in Nonlinear Optical Waveguides.” Optical and Quantum Electronics 41 (9): 705–709.
APA
Le Quang, K., & Bienstman, P. (2009). The complex Jacobi iterative method for non-paraxial beam propagation in nonlinear optical waveguides. OPTICAL AND QUANTUM ELECTRONICS, 41(9), 705–709.
Vancouver
1.
Le Quang K, Bienstman P. The complex Jacobi iterative method for non-paraxial beam propagation in nonlinear optical waveguides. OPTICAL AND QUANTUM ELECTRONICS. 2009;41(9):705–9.
MLA
Le Quang, Khai, and Peter Bienstman. “The Complex Jacobi Iterative Method for Non-paraxial Beam Propagation in Nonlinear Optical Waveguides.” OPTICAL AND QUANTUM ELECTRONICS 41.9 (2009): 705–709. Print.
@article{1146639,
  abstract     = {The recently introduced beam propagation method using complex Jacobi iteration adapted for modeling of non-paraxial beam propagation in nonlinear optical waveguides is presented in this paper. The beam propagation equation is based on our recently proposed modified Pad,(1,1) approximant operator. The resulting approach is very efficient and well-suited for large structures with long propagation paths.},
  author       = {Le Quang, Khai and Bienstman, Peter},
  issn         = {0306-8919},
  journal      = {OPTICAL AND QUANTUM ELECTRONICS},
  keywords     = {PADE APPROXIMANT OPERATORS},
  language     = {eng},
  number       = {9},
  pages        = {705--709},
  title        = {The complex Jacobi iterative method for non-paraxial beam propagation in nonlinear optical waveguides},
  url          = {http://dx.doi.org/10.1007/s11082-010-9382-2},
  volume       = {41},
  year         = {2009},
}

Altmetric
View in Altmetric
Web of Science
Times cited: