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Asymptotic Analysis and Soliton Interactions of the Multi-Pole Solutions in the Hirota Equation

Min Li, Xue-Feng Zhang, Tao Xu, Lingling Li

2020Journal of the Physical Society of Japan54 citationsDOI

Abstract

Based on the Darboux transformation and N-soliton solutions, we obtain the explicit formulas of arbitrary-order multi-pole (MP) solutions of the Hirota equation via some limit technique. Then, by an improved asymptotic analysis method relying on the balance between exponential and algebraic terms, we derive the accurate expressions of all asymptotic solitons in the double- and triple-pole solutions. Moreover, we study the soliton interactions in the MP solutions and especially emphasize some unusual properties, like the interacting solitons separate from each other in a logarithmical law, the strengths of interaction forces decrease exponentially with their relative distances, and the constant–velocity asymptotic soliton does not experience a phase shift upon an interaction.

Topics & Concepts

SolitonAlgebraic numberPhysicsLimit (mathematics)Transformation (genetics)Exponential functionConstant (computer programming)Asymptotic analysisExponential decayOrder (exchange)Mathematical physicsMathematical analysisQuantum mechanicsNonlinear systemMathematicsProgramming languageGeneChemistryFinanceBiochemistryEconomicsComputer scienceNonlinear Waves and SolitonsNonlinear Photonic SystemsFractional Differential Equations Solutions
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