New numerical simulation for fractional Benney–Lin equation arising in falling film problems using two novel techniques
W Gao, P Veeresha, DG Prakasha… - … Methods for Partial …, 2021 - Wiley Online Library
The pivotal aim of the present work is to find the numerical solution for fractional Benney–Lin
equation by using two efficient methods, called q‐homotopy analysis transform method and …
equation by using two efficient methods, called q‐homotopy analysis transform method and …
Soliton solutions to the DNA Peyrard–Bishop equation with beta-derivative via three distinctive approaches
In this paper, we explore the DNA dynamic equation arising in the oscillator-chain named as
Peyrard–Bishop model for abundant solitary wave solutions. The aforesaid model is studied …
Peyrard–Bishop model for abundant solitary wave solutions. The aforesaid model is studied …
[HTML][HTML] A variety of soliton solutions for the fractional Wazwaz-Benjamin-Bona-Mahony equations
In the present paper, the new three-dimensional modified Benjamin-Bona-Mahony
equations recently introduced are analyzed with the introduction of the spatial and temporal …
equations recently introduced are analyzed with the introduction of the spatial and temporal …
New structures for the space-time fractional simplified MCH and SRLW equations
In this paper, we constructed new solitary structures for the space-time fractional simplified
modified Camassa-Holm (MCH) equation and space-time fractional symmetric regularized …
modified Camassa-Holm (MCH) equation and space-time fractional symmetric regularized …
A plentiful supply of soliton solutions for DNA Peyrard–Bishop equation by means of a new auxiliary equation strategy
In this paper, we present a work on dynamic equation of Deoxyribonucleic acid (DNA)
derived from the Peyrard–Bishop (PB) model oscillator chain for various dynamical solitary …
derived from the Peyrard–Bishop (PB) model oscillator chain for various dynamical solitary …
New optical soliton solutions via two distinctive schemes for the DNA Peyrard–Bishop equation in fractal order
The deoxyribonucleic acid (DNA) dynamical equation, which emerges from the oscillator
chain known as the Peyrard–Bishop (PB) model for abundant optical soliton solutions, is …
chain known as the Peyrard–Bishop (PB) model for abundant optical soliton solutions, is …
New hyperbolic structures for the conformable time-fractional variant bussinesq equations
In this work, exact analytical solutions for the time fractional variant bussinesq equations are
constructed in the sense of the newly devised fractional derivative called conformable …
constructed in the sense of the newly devised fractional derivative called conformable …
[HTML][HTML] New exact solitary wave solutions for the extended (3+ 1)-dimensional Jimbo-Miwa equations
KK Ali, RI Nuruddeen, AR Hadhoud - Results in Physics, 2018 - Elsevier
In this manuscript, new solitary wave solutions for the newly introduced extended (3+ 1)-
dimensional Jimbo-Miwa equations (the first and second) by Wazwaz (2017) are presented …
dimensional Jimbo-Miwa equations (the first and second) by Wazwaz (2017) are presented …
Optical soliton solutions of the fractional perturbed nonlinear schrodinger equation
KK Ali, SBG Karakoç… - TWMS Journal of Applied …, 2020 - belgelik.isikun.edu.tr
This paper is interested in a set of conformable fractional derivative for constructing optical
soliton solutions to the fractional perturbed nonlinear Schrödinger equation. The powerful …
soliton solutions to the fractional perturbed nonlinear Schrödinger equation. The powerful …
New perception of the exact solutions of the 3D-fractional Wazwaz-Benjamin-Bona-Mahony (3D-FWBBM) equation
A Bekir, MSM Shehata, EHM Zahran - Journal of Interdisciplinary …, 2021 - Taylor & Francis
In this article we will utilize new perception of the Benjamin-Bona-Mahony equation that
represents developed stretch for the Korteweg-de Varies equation which denotes to the …
represents developed stretch for the Korteweg-de Varies equation which denotes to the …