Multi-soliton, breathers, lumps and interaction solution to the (2+1)-dimensional asymmetric Nizhnik-Novikov-Veselov equation

Hossen, Md. Belal; Roshid, Harun-Or; Ali, M. Zulfikar

doi:10.1016/j.heliyon.2019.e02548

Cited by 27 publications

(9 citation statements)

References 30 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Let us consider the (2+1)-dimensional asymmetric Nizhnik-Novikov-Veselov (ANNV) equation [27][28][29]…”

Section: The Bilinear Form Of the Annv Modelmentioning

confidence: 99%

“…[3,23] In this work, we present new theories with proper examples to built dynamical interactions between rogue waves and different forms of n-solitons solutions for the (2+1)dimensional asymmetric Nizhnik-Novikov-Veselov (ANNV) equation via the Hirota bilinear scheme. [24][25][26][27][28] To our knowledge, this is a first step to study these type of dynamical interactions with the existing theories for the ANNV model.…”

Section: Introductionmentioning

confidence: 98%

See 1 more Smart Citation

Dynamical interactions between higher-order rogue waves and various forms of n-soliton solutions (n → ∞) of the (2+1)-dimensional ANNV equation

2020

View full text Add to dashboard Cite

We present new lemmas, theorem and corollaries to construct interactions among higher-order rogue waves, n-periodic waves and n-solitons solutions (n → ∞) to the (2+1)-dimensional asymmetric Nizhnik–Novikov–Veselov (ANNV) equation. Several examples for theories are given by choosing definite interactions of the wave solutions for the model. In particular, we exhibit dynamical interactions between a rogue and a cross bright-dark bell wave, a rogue and a cross-bright bell wave, a rogue and a one-, two-, three-, four-periodic wave. In addition, we also present multi-types interactions between a rogue and a periodic cross-bright bell wave, a rogue and a periodic cross-bright-bark bell wave. Finally, we physically explain such interaction solutions of the model in the 3D and density plots.

show abstract

“…Let us consider the (2+1)-dimensional asymmetric Nizhnik-Novikov-Veselov (ANNV) equation [27][28][29]…”

Section: The Bilinear Form Of the Annv Modelmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 98%

Dynamical interactions between higher-order rogue waves and various forms of n-soliton solutions (n → ∞) of the (2+1)-dimensional ANNV equation

2020

View full text Add to dashboard Cite

show abstract

“…Additional integral forms that preserve lump wave solutions are Boussinesq [21], BKP [22], Davey-Stewartson II [23], Ishimori-I [24] model equations. Due to coherent rationale results, lump propagation are analytical rational function solutions confined to a small area in every routes in space whereas lump waves are limited to a small area in nearly every but not every routes in space [25][26][27][28]. Rogue waves are bizarrely massive, erratic even rapidly occurring surface waves which can be immensely hazardous to hits the ships in deep ocean, even invert it due to massive ones.…”

Section: Introductionmentioning

confidence: 99%

Interactions of rogue and solitary wave solutions to the (2 + 1)-D generalized Camassa–Holm–KP equation

et al. 2022

Self Cite

View full text Add to dashboard Cite

This research explores a (2+1)-d generalized Camassa-Holm-Kadomtsev-Petviashvili (gCHKP) model. We use a probable transformation to build bilinear formulation to the model by Hirota bilinear technique. We derive a single lump waves, multi-solitons solutions to the model from this bilinear form. We present various dynamical properties of the model such as one-, two-, three-, four-solitons. The double periodic breather waves, periodic line rogue wave, interaction between bell soliton and double periodic rogue waves, rogue and bell soliton, rogue and two bell solitons, two rogues, rogue and periodic wave, double periodic waves, two pair of rogue waves as well as interaction of double periodic rogue waves are established in a line. Among the results, most of the properties are unexplored in the prior research. Furthermore, with the assistance of Maple Software, we put out the trajectory of the obtained solutions for visualized the achieved dynamical properties.

show abstract

“…Thereupon, divergent skills have been implemented to find out multi-soliton solutions and interact soliton of nonlinear evolution equations, such as bilinear formalism and various ansatze's function [20] , novel transformation method [21] , direct rational exponential scheme [22] and multi expansion function method [23] etc. To establish the interaction and multi-soliton solution via Hirota's bilinear method, different ansatze functions was used in [24] , [25] , [26] , [27] , [28] .…”

Section: Introductionmentioning

confidence: 99%

Dynamical interaction of solitary, periodic, rogue type wave solutions and multi-soliton solutions of the nonlinear models

Abdeljabbar¹,

Aldurayhim²,

Rahman³

et al. 2022

Heliyon

View full text Add to dashboard Cite

Multi-soliton, breathers, lumps and interaction solution to the (2+1)-dimensional asymmetric Nizhnik-Novikov-Veselov equation

Cited by 27 publications

References 30 publications

Dynamical interactions between higher-order rogue waves and various forms of n-soliton solutions (n → ∞) of the (2+1)-dimensional ANNV equation

Dynamical interactions between higher-order rogue waves and various forms of n-soliton solutions (n → ∞) of the (2+1)-dimensional ANNV equation

Interactions of rogue and solitary wave solutions to the (2 + 1)-D generalized Camassa–Holm–KP equation

Dynamical interaction of solitary, periodic, rogue type wave solutions and multi-soliton solutions of the nonlinear models

Contact Info

Product

Resources

About