The evolution of poise of arbitrary initial form with chirp in weakly nonlinear dispersion fiber

Author

Chongqing, Wu ; Hongjing, Zhao ; Zhi, Wang ; Ying, Tao

Author_Institution

Inst. of Lightwave Technol., Northern Jiaotong Univ., Beijing, China

fYear

1998

fDate

22-24 Oct 1998

Abstract

With the success in linear dispersion compensation techniques, a new limitation, nonlinearity, will accumulate when the length of the fiber link increases. In this paper, we obtain the series solution of a nonlinear Schrodinger equation (NLS equation) in the frequency domain, suitable for pulses of arbitrary initial form with chirp. We derive the evolution of the spectrum of a Gauss pulse with chirp in this fiber when only considering the first-order initial nonlinearity, and the approximate formula of the broadening factor without chirp. Finally, the figures of spectrum, pulse form, and broadening factor versus distance, dispersion nonlinearity and chirp are given

Keywords

Schrodinger equation; chirp modulation; frequency-domain analysis; nonlinear optics; optical fibre communication; optical fibre dispersion; optical pulse generation; series (mathematics); Gauss pulse spectrum; NLS equation; approximate formula; broadening factor; chirp; dispersion nonlinearity; distance; fiber link length; first-order initial nonlinearity; frequency domain; linear dispersion compensation; nonlinear Schrodinger equation; pulse evolution; pulse form; series solution; weakly nonlinear dispersion fiber; Chirp; Frequency domain analysis; Gaussian approximation; Linear systems; Nonlinear equations; Optical fiber communication; Optical fiber dispersion; Optical pulses; Solitons; Space vector pulse width modulation;

fLanguage

English

Publisher

ieee

Conference_Titel

Communication Technology Proceedings, 1998. ICCT '98. 1998 International Conference on

Conference_Location

Beijing

Print_ISBN

7-80090-827-5

Type

conf

DOI

10.1109/ICCT.1998.743379

Filename

743379