Controlling cosine-Gaussian beams in linear media with quadratic external potential

We investigate both analytically and numerically the propagation dynamic of on-axis and off-axis cosine-Gaussian (CG) beams in a linear medium with quadratic external potential. CG beam propagation evolves periodically with a period depended on the potential depth (α) and whether the beam shape is s...

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Veröffentlicht in:Optics express 2021-02, Vol.29 (4), p.5128-5140
Hauptverfasser: Zhang, Lifu, Li, Haozhe, Liu, Zhao, Zhang, Jin, Cai, Wangyang, Gao, Yanxia, Fan, Dianyuan
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Sprache:eng
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Zusammenfassung:We investigate both analytically and numerically the propagation dynamic of on-axis and off-axis cosine-Gaussian (CG) beams in a linear medium with quadratic external potential. CG beam propagation evolves periodically with a period depended on the potential depth (α) and whether the beam shape is symmetrical with respect to optical axis. In each period, the CG beam first splits into two sub-beams with different accelerated direction; they then reverse the accelerated direction owing to the quadratic external potential and finally merge again to reproduce its initial shape, and the whole process repeats periodically. The intensity oscillation period of the off-axis CG beam is double times than that of the on-axis one. At the special position, the beam (or spectral) shape is strongly related to the initial spectral (beam) shape. The corresponding scaled relationship is that the spatial intensity I (or spatial frequency axis k) is α times the spectral intensity I (or space axis x). The interaction of two spatially separated CG beams still exhibit periodic evolution with complex structure in the regime of focal point. The propagation dynamics of two-dimensional CG beams are also presented. When the propagation distance is exactly an integer multiple of half period, there are four focal points in the diagonal position.
ISSN:1094-4087
1094-4087
DOI:10.1364/OE.418392