Lie symmetry analysis, optimal system and invariant solutions of (3+1)-dimensional nonlinear wave equation in liquid with gas bubbles

Yadav, Shalini; Arora, Rajan

doi:10.1140/epjp/s13360-021-01073-z

Cited by 22 publications

(9 citation statements)

References 27 publications

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“…Satapathy and Raja Sekhar [34] solve Chaplygin gas equations with accurate answers. The authors in the literature [35, 36] used the Lie symmetry analysis to find some new exact solutions of the

\left(3&#x0002B;1\right)

‐dimensional non‐linear water wave equation in liquid with gas bubbles and

\left(2&#x0002B;1\right)

‐dimensional modified dispersive water wave (MDWW) equation. The authors found novel and precise solutions of compressible isentropic Navier–Stokes equation utilizing optimal subalgebras in Jiwari et al [37].…”

Section: Introductionmentioning

confidence: 99%

Invariance analysis, optimal system, and group invariant solutions of (3+1)‐dimensional non‐linear MA‐FAN equation

Sharma

Yadav

Arora

2023

Math Methods in App Sciences

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The importance of research on non‐linear evolution equations has increased over time. In the fields of plasma physics, fluid mechanics, optical fibers, and other sciences, such equations are not unrealistic. Discovering the exact answers to these equations needs to be a top priority. In this study, we will investigate a ‐dimensional non‐linear MA‐FAN equation that is used to simulate weakly non‐linear restoring forces and frequency dispersion in long wavelength water waves. The ‐dimensional MA‐FAN equation's solution is analyzed using the Lie symmetry analysis, and it is also used to pick the appropriate one‐dimensional Lie subalgebra system. We discover invariant solutions of the ‐dimensional MA‐FAN equation, which may capture the dynamic behavior of non‐linear waves, by solving the numerous ordinary differential equations that are reduced equations from the MA‐FAN equation by using the Lie group of transformation approach. In conclusion, the method offered is robust and convenient tool for studying various classes of non‐linear PDE solutions.

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“…Satapathy and Raja Sekhar [34] solve Chaplygin gas equations with accurate answers. The authors in the literature [35, 36] used the Lie symmetry analysis to find some new exact solutions of the

\left(3&#x0002B;1\right)

‐dimensional non‐linear water wave equation in liquid with gas bubbles and

\left(2&#x0002B;1\right)

Section: Introductionmentioning

confidence: 99%

Invariance analysis, optimal system, and group invariant solutions of (3+1)‐dimensional non‐linear MA‐FAN equation

Sharma

Yadav

Arora

2023

Math Methods in App Sciences

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“…These invariant solutions describe their behavior like they display its asymptotic nature and the information of the singularities if it exists. Thus, various efficient methods and techniques are there to obtain exact soliton solutions, such as inverse scattering transformation [1], Hirota bilinear method [2], nonlocal symmetry [3], Bäcklund transformation [3], Painlevé analysis [3], Lie symmetry method [4][5][6][7][8][9][10][11][12][13][14][15][16][17][18][19][20][21][22], etc.…”

Section: Introductionmentioning

confidence: 99%

Symmetry analysis, optimal classification and dynamical structure of exact soliton solutions of (2+1)-dimensional modified Bogoyavlenskii–Schiff equation

Kumar

Manju

2022

Phys. Scr.

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The present research framework looks over complete sorted symmetry group classification and optimal subalgebras of (2+1)-dimensional modified Bogoyavlenskii–Schiff(mBSchiff) equation. It’s highly nonlinear and exhibits wave propagation in thermal pulse, sound wave, and bound particle. Using the invariance property of Lie groups, adequate infinitesimal symmetry of Lie algebra has been set up for the mBSchiff equation. A rigorous and systematized algorithm is carried out to obtain one optimal system based on the invariance feature of adjoint transformation. Further, symmetry reduction of the mBSchiff equation has been made to derive a system of ordinary differential equations with newly established similarity variables. The complete set of group invariant solutions for each corresponding subalgebras has been made. The derived solutions have diverse physical phenomena, which MATLAB simulation can quickly analyze. Thus, solutions presented here are kink, positon, soliton, doubly soliton, negaton, multisoliton types, which add on some meaningful physical aspects of the research.

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“…There is a plethora of applications in the literature on the symmetry analysis of various dynamical systems. The method of symmetry analysis is applied in various systems of fluid dynamics in the studies [12][13][14][15][16][17][18][19][20][21][22][23][24]. The Burgers-heat system is investigated by applying the symmetry analysis in the studies [25,26].…”

Section: Introductionmentioning

confidence: 99%

Similarity transformations and linearization for a family of dispersionless integrable PDEs

Paliathanasis

2022

Preprint

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We apply the theory of Lie point symmetries for the study of a family of partial differential equations which are integrable by the hyperbolic reductions method and are reduced to members of the Painlevé transcendents. The main results of this study is that from the application of the similarity transformations provided by the Lie point symmetries all the members of the family of the partial differential equations are reduced to second-order differential equations which are maximal symmetric and can be linearized.

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Lie symmetry analysis, optimal system and invariant solutions of (3+1)-dimensional nonlinear wave equation in liquid with gas bubbles

Cited by 22 publications

References 27 publications

Invariance analysis, optimal system, and group invariant solutions of (3+1)‐dimensional non‐linear MA‐FAN equation

Invariance analysis, optimal system, and group invariant solutions of (3+1)‐dimensional non‐linear MA‐FAN equation

Symmetry analysis, optimal classification and dynamical structure of exact soliton solutions of (2+1)-dimensional modified Bogoyavlenskii–Schiff equation

Similarity transformations and linearization for a family of dispersionless integrable PDEs

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