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A comprehensive study on zero-background solitons of the sharp-line Maxwell-Bloch equations

Author:
Sitai Li
Keyword:
Nonlinear Sciences, Exactly Solvable and Integrable Systems, Exactly Solvable and Integrable Systems (nlin.SI), Analysis of PDEs (math.AP), Pattern Formation and Solitons (nlin.PS)
journal:
--
date:
2024-02-03 00:00:00
Abstract
This work is devoted to systematically study general $N$-soliton solutions possibly containing multiple degenerate soliton groups (DSGs), in the context of the sharp-line Maxwell-Bloch equations with a zero background. A DSG is a localized coherent nonlinear traveling-wave structure, comprised of inseparable solitons with identical velocities. Hence, DSGs are generalizations of single solitons (considered as $1$-DSGs), and form fundamental building blocks of solutions of many integrable systems. We provide an explicit formula for an $N$-DSG and its center from an appropriate Riemann-Hilbert problem. With the help of the Deift-Zhou's nonlinear steepest descent method, we rigorously prove the localization of DSGs, and calculate the long-time asymptotics for an arbitrary $N$-soliton solutions. We show that the solution becomes a linear combination of multiple DSGs with different sizes in the distant past and future. The asymptotic phase shift for each DSG is obtained in the process as well. Other generalizations of a single soliton are also carefully discussed, such as $N$th-order solitons and soliton gases. We prove that every $N$th-order soliton can be obtained by fusion of eigenvalues of $N$-soliton solutions, with proper rescalings of norming constants, and every soliton-gas solution can be considered as limits of $N$-soliton solutions as $N\to+\infty$. Consequently, certain properties of $N$th-order solitons and soliton gases are obtain as well. With the approach presented in this work, we show that results can be readily migrated to other integrable systems, with the same non-self-adjoint Zakharov-Shabat scattering problem or alike. Results for the focusing nonlinear Schr\"{o}dinger equation and complex modified Korteweg-De Vries equation are obtained as explicit examples for demonstrative purposes.
PDF: A comprehensive study on zero-background solitons of the sharp-line Maxwell-Bloch equations.pdf
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