Results 251 to 260 of about 987,859 (318)
Exploring complex phenomena in fluid flow and plasma physics via the Schrödinger-type Maccari system. [PDF]
Sci RepAbbas N +6 more
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The KPZ Equation of Kinetic Interface Roughening: A Variational Perspective. [PDF]
Entropy (Basel)Wio HS +5 more
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Identification of stochastic optical solitons in a generalized NLSE characterized by fourth order dispersion and weak nonlocality. [PDF]
Sci RepAhmed KK +5 more
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Physica Scripta, 2022
This research aims to investigate a generalized fifth-order nonlinear partial differential equation for the Sawada-Kotera (SK), Lax, and Caudrey-Dodd-Gibbon (CDG) equations to study the nonlinear wave phenomena in shallow water, ion-acoustic waves in ...
Sachin Kumar, Brij Mohan, Amit Kumar
semanticscholar +1 more source
This research aims to investigate a generalized fifth-order nonlinear partial differential equation for the Sawada-Kotera (SK), Lax, and Caudrey-Dodd-Gibbon (CDG) equations to study the nonlinear wave phenomena in shallow water, ion-acoustic waves in ...
Sachin Kumar, Brij Mohan, Amit Kumar
semanticscholar +1 more source
Communications in Theoretical Physics, 2022
Lump solutions are one of the most common solutions for nonlinear evolution equations. This study aspires to investigate the generalized Hietarintatype equation. We auspiciously provide multiple M-lump waves.
H. Ismael, T. Sulaiman, M. Osman
semanticscholar +1 more source
Lump solutions are one of the most common solutions for nonlinear evolution equations. This study aspires to investigate the generalized Hietarintatype equation. We auspiciously provide multiple M-lump waves.
H. Ismael, T. Sulaiman, M. Osman
semanticscholar +1 more source
Physics Letters, 2021
Water waves are observed in many situations, as well as on rivers, lakes or oceans. In this paper, the investigation is conducted on a ( 3 + 1 ) -dimensional generalized nonlinear evolution equation arising in shallow water waves.
Yuan Shen, B. Tian, Shao-Hua Liu
semanticscholar +1 more source
Water waves are observed in many situations, as well as on rivers, lakes or oceans. In this paper, the investigation is conducted on a ( 3 + 1 ) -dimensional generalized nonlinear evolution equation arising in shallow water waves.
Yuan Shen, B. Tian, Shao-Hua Liu
semanticscholar +1 more source
Mathematical methods in the applied sciences, 2021
The (3 + 1)‐dimensional generalized nonlinear evolution equation is investigated based on the Hirota bilinear method. N‐soliton solutions, bilinear Bäcklund transformation, high‐order lump solutions, and the interaction phenomenon of high‐order lump ...
Peng Han, Taogetusang Bao
semanticscholar +1 more source
The (3 + 1)‐dimensional generalized nonlinear evolution equation is investigated based on the Hirota bilinear method. N‐soliton solutions, bilinear Bäcklund transformation, high‐order lump solutions, and the interaction phenomenon of high‐order lump ...
Peng Han, Taogetusang Bao
semanticscholar +1 more source
Oberwolfach Reports, 2009
Following the successful pattern of the meeting in 2005, this year's workshop on 'Nonlinear Evolution Problems' focussed on a small number of currently very active areas in this field. By far the dominant theme, however, were geometric evolution equations of parabolic type, followed by the topic of wave equations and water waves ...
Klaus Ecker +2 more
openaire +1 more source
Following the successful pattern of the meeting in 2005, this year's workshop on 'Nonlinear Evolution Problems' focussed on a small number of currently very active areas in this field. By far the dominant theme, however, were geometric evolution equations of parabolic type, followed by the topic of wave equations and water waves ...
Klaus Ecker +2 more
openaire +1 more source