Cage solitons

Günter Steinmeyer; Tamas Nagy; Ihar Babushkin; Chao Mei

doi:10.1117/12.2612337

4 March 2022 Cage solitons

Günter Steinmeyer, Tamas Nagy, Ihar Babushkin, Chao Mei

Author Affiliations +

Proceedings Volume 11986, Real-time Measurements, Rogue Phenomena, and Single-Shot Applications VII; 1198602 (2022) https://doi.org/10.1117/12.2612337
Event: SPIE LASE, 2022, San Francisco, California, United States

Abstract

Soliton solutions of the Haus master equation and the transverse wave equation are discussed. These solutions are obtained by converting the eigenvalue problem of a differential operator into an algebraic problem. Compared to free space solutions of the respective equation, the solutions space shrinks to discrete soliton solutions, which often strongly deviate from the well-known bell-shaped free space solutions. We find qualitatively very similar solutions describing two very different physical scenarios. As these solitons show a similar reaction to a limited support in the Fourier domain, we term these characteristic profiles cage solitons.

Citation Download Citation

Günter Steinmeyer, Tamas Nagy, Ihar Babushkin, and Chao Mei "Cage solitons", Proc. SPIE 11986, Real-time Measurements, Rogue Phenomena, and Single-Shot Applications VII, 1198602 (4 March 2022); https://doi.org/10.1117/12.2612337

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