Title
Talbot effect for dispersion in linear optical fibers and a wavelet approach
11627/347211627/3472
Author
Rosu Barbus, Haret-Codratian
Treviño Gutiérrez, Juan Pablo
Cabrera Ibarra, Hugo
Murguía, José
Abstract
"We shortly recall the mathematical and physical aspects of Talbot’s self-imaging effect occurring in near-field diffraction. In the rational paraxial approximation, the Talbot images are formed at distances z = p/q, where p and q are coprimes, and are superpositions of q equally spaced images of the original binary trans-mission (Ronchi) grating. This interpretation offers the possibility to express the Talbot effect through Gauss sums. Here, we pay attention to the Talbot effect in the case of dispersion in optical fibers presenting our considerations based on the close relationships of the mathematical representations of diffraction and disper-sion. Although dispersion deals with continuous functions, such as gaussian and supergaussian pulses, whereas in diffraction one frequently deals with discontin-uous functions, the mathematical correspondence enables one to characterize the Talbot effect in the two cases with minor differences. In addition, we apply, for the first time to our knowledge, the wavelet transform to the fractal Talbot effect in both diffraction and fiber dispersion. In the first case, the self similar character of the transverse paraxial field at irrational multiples of the Talbot distance is confirmed, whereas in the second case it is shown that the field is not self simi-lar for supergaussian pulses. Finally, a high-precision measurement of irrational distances employing the fractal index determined with the wavelet transform is pointed out."
Publication date
2006Publication type
articleDOI
https://doi.org/10.1142/S0217979206034364Knowledge area
CIENCIAS FÍSICO MATEMÁTICAS Y CIENCIAS DE LA TIERRAEditor
World Scientific Publishing CompanyKeywords
Talbot effectWavelet transform