Results 71 to 78 of about 292 (78)

Diverse soliton wave profile assessment to the fractional order nonlinear Landau-Ginzburg-Higgs and coupled Boussinesq-Burger equations

Results in Physics
The space–time fractional Landau-Ginzburg-Higgs equation and coupled Boussinesq-Burger equation describe the behavior of nonlinear waves in the tropical and mid-latitude troposphere, exhibiting weak scattering, extended connections, arising from the ...
Anamika Podder, Mohammad Asif Arefin, Khaled A. Gepreel, M. Hafiz Uddin, M. Ali Akbar   +4 more
doaj  

Serum screening for oncogene proteins in workers exposed to PCBs. [PDF]

Br J Ind Med, 1988
Brandt-Rauf PW, Niman HL.
europepmc   +1 more source

Computational analysis and wave propagation behavior of hyper-geometric soliton waves in plasma physics via the auxiliary equation method

Partial Differential Equations in Applied Mathematics
This study investigate the widely used nonlinear fractional Kairat-II (K-II) model, which is used to explain the differential geometry of curves and equivalence aspects.
M. Al-Amin, M. Nurul Islam, M. Ali Akbar
doaj  

Investigation of new solitary stochastic structures to the Heisenberg ferromagnetic spin chain model via a Stratonovich sense

Partial Differential Equations in Applied Mathematics
This study examines how Stratonovich integrals (SIs) affect the solutions of the Heisenberg ferromagnetic spin chain (HFSC) equation using the modified (G'/G)-expansion (MG'/GE) scheme.
Md. Nur Alam
doaj  

Study of the parametric effect of the wave profiles of the time-space fractional soliton neuron model equation arising in the topic of neuroscience

Partial Differential Equations in Applied Mathematics
Time-space fractional nonlinear problems (T-SFNLPs) play a crucial role in the study of nonlinear wave propagation. Time-space nonlinearity is prevalent across various fields of applied science, nonlinear dynamics, mathematical physics, and engineering ...
Md. Nur Alam, Md. Azizur Rahman
doaj  

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Inverse Scattering Transform and Soliton Solutions for the Hirota Equation with $N$ Distinct Arbitrary Order Poles

Advances in Applied Mathematics and Mechanics, 2022
We employ the Riemann-Hilbert (RH) method to study the Hirota equation with arbitrary order zero poles under zero boundary conditions. Through the spectral analysis, the asymptoticity, symmetry, and analysis of the Jost functions are obtained, which play
Xiaofan Zhang, Shoufu Tian null, Jin-Jie Yang   +2 more
semanticscholar   +1 more source

Solutions to a Vector Heisenberg Ferromagnet Equation Related to Symmetric Spaces

Geometry Integrability and Quantization, 2019
In this report we consider a vector generalization of Heisenberg ferromagnet equation. That completely integrable system is related to a spectral problem in pole gauge for the Lie algebra sl(n + 1,C).
T. Valchev, A. Yanovski
semanticscholar   +1 more source

Constructing a train of soliton solutions for the three-wave-interaction equations

, 2013
An exact solution of the Three-Wave-Interaction (TWI) equations is well known by a compact formula called the N−soliton solution, a deep look to this solution shows that we need to find the inverse of some matrix whose entries are long formula of ...
Sahar Alqaraleh, Feras M. Al Faqih, Adeeb G. Talafha   +2 more
semanticscholar   +1 more source