New closed form solutions of some nonlinear pseudo-parabolic models via a new extended direct algebraic method

Hussain, Akhtar; Ali, Hassan; Zaman, Fiazuddin; Abbas, Naseem

doi:10.2478/ijmce-2024-0004

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New closed form solutions of some nonlinear pseudo-parabolic models via a new extended direct algebraic method

International Journal of Mathematics and Computer in Engineering

Volume 2 (2024): Issue 1 (June 2024)

By: Akhtar Hussain, Hassan Ali, Fiazuddin Zaman and Naseem Abbas

Open Access

|Oct 2023

Figures & Tables

3D surface of v1(x, t) given in (49) with ω3 = 1, μ = 3, ϕ = e, b0 = 1, α = γ = 1 and θ = −1.

3D surface of v6(x, t) given in (66) with ω1 = 1, ω2 = 1, ω3 = 2, μ = 3, ϕ = e, b2 = −1 and λ = 1.

3D surface of |v8(x, t)| given in (50) with ω1 = 1, ω2 = 1, ω3 = 2, μ = 3, ϕ = e, b0 = 1, α = 1, θ = 1, r = 1 and γ = 1.

3D surface of v36(x, t) given in (75) with ω1 = 0, b2 = −1, ω2 = 1, μ = 3, ϕ = e, s = 1, and λ1 = 1.

DOI: https://doi.org/10.2478/ijmce-2024-0004 | Journal eISSN: 2956-7068

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Language: English

Page range: 35 - 58

Submitted on: Aug 11, 2023

Accepted on: Sep 11, 2023

Published on: Oct 31, 2023

Published by: Harran University

In partnership with: Paradigm Publishing Services

Publication frequency: 2 issues per year

Keywords:

Benjamin-Bona-Mahony-Peregrine equation,

generalized hyper elastic rod wave equation,

pseudo-parabolic class,

new extended direct algebraic method

Related subjects:

Computer sciences,

Computer sciences, other,

Engineering,

Introductions and overviews,

Physics,

© 2023 Akhtar Hussain, Hassan Ali, Fiazuddin Zaman, Naseem Abbas, published by Harran University
This work is licensed under the Creative Commons Attribution 4.0 License.

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