Evolution of supergaussian pulses in nonlinear Kerr media
DOI:
https://doi.org/10.4302/photon.%20lett.%20pl.v1i4.81Abstract
The propagation of temporal pulses through nonlinear Kerr media with an initial supergaussian shape is described analytically and numerically. The analytical description is based on the canonical method. For a supergaussian profile as the trial function, the Euler-Lagrange equations are derived and solved. Accuracy of the canonical description and it's regime of applicability is discussed.Full Text: PDF
References:
- G.P. Agrawal, Nonlinear Fiber Optics, (Academic Press, San Diego 2001)
- D. Anderson, "Variational approach to nonlinear pulse propagation in optical fibers", Phys. Rev. A, 27, 3135, (1983)[CrossRef]
- C. Sulem, P.L. Sulem, The Nonlinear Schrodinger Equation: Self-Focusing and Wave Collapse, (New York, Springer-Verlag, 1999)
- G.P. Agrawal, Lightwave technology:telecommunications systems, (Wiley Interscience, Hoboken, 2005)
- C.-J. Rosenberg, D. Anderson, M. Desaix, P. Johannisson, M. Lisak, "Evolution of optical pulses towards wave breaking in highly nonlinear fibres", Opt. Commun., 273, 272-277, (2007)[CrossRef]
- J. Jasiński, Phot. Lett. Poland 1, 64, (2009)
- J. Jasiński, Phot. Lett. Poland 1, 139, (2009)
- H. Goldstein, C. Poole, J. Safko, Classical Mechanics, (Addison Wesley, San Francisco, 2000)
Downloads
Published
2009-12-31
How to Cite
[1]
J. Jasiński and Łukasz Michalik, “Evolution of supergaussian pulses in nonlinear Kerr media”, Photonics Lett. Pol., vol. 1, no. 4, pp. pp. 178–180, Dec. 2009.
Issue
Section
Articles