Pages that link to "Item:Q620902"
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The following pages link to Variable-coefficient higher-order nonlinear Schrödinger model in optical fibers: variable-coefficient bilinear form, Bäcklund transformation, Brightons and symbolic computation (Q620902):
Displaying 13 items.
- Analytic Multi-Solitonic Solutions of Variable-Coefficient Higher-Order Nonlinear Schrödinger Models by Modified Bilinear Method with Symbolic Computation (Q3069820) (← links)
- Vadermonde-Type Odd-Soliton Solutions for the Whitham–Broer–Kaup Model in the Shallow Water Small-Amplitude Regime (Q3161579) (← links)
- THE PAINLEVÉ INTEGRABILITY AND N-SOLITONIC SOLUTION IN TERMS OF THE WRONSKIAN DETERMINANT FOR A VARIABLE-COEFFICIENT VARIANT BOUSSINESQ MODEL OF NONLINEAR WAVES (Q3401846) (← links)
- Two types of generalized integrable decompositions and new solitary-wave solutions for the modified Kadomtsev-Petviashvili equation with symbolic computation (Q3544586) (← links)
- Exact quasi-soliton solutions and soliton interaction for the inhomogeneous coupled nonlinear Schrödinger equations (Q3568292) (← links)
- A new approach to the analytic soliton solutions for the variable-coefficient higher-order nonlinear Schrödinger model in inhomogeneous optical fibers (Q3568302) (← links)
- MULTI-SOLITON SOLUTIONS AND THEIR INTERACTIONS FOR THE (2+1)-DIMENSIONAL SAWADA-KOTERA MODEL WITH TRUNCATED PAINLEVÉ EXPANSION, HIROTA BILINEAR METHOD AND SYMBOLIC COMPUTATION (Q3655704) (← links)
- BILINEAR FORM AND SOLITON SOLUTIONS FOR THE COUPLED NONLINEAR KLEIN–GORDON EQUATIONS (Q4914485) (← links)
- Nonautonomous solitons for an extended forced Korteweg-de Vries equation with variable coefficients in the fluid or plasma (Q5104056) (← links)
- An extension of the Wronskian technique for the multicomponent Wronskian solution to the vector nonlinear Schrödinger equation (Q5246617) (← links)
- Bell-polynomial approach and <i>N</i>-soliton solution for the extended Lotka–Volterra equation in plasmas (Q5263596) (← links)
- Parallel physics-informed neural networks method with regularization strategies for the forward-inverse problems of the variable coefficient modified KdV equation (Q6130986) (← links)
- Gradient-enhanced physics-informed neural networks based on transfer learning for inverse problems of the variable coefficient differential equations (Q6191522) (← links)
