Mathematical studies of the solution of Burgers' equations by Adomian decomposition method

Zeidan, Dia; Chau, Chi Kin; Lu, Tzon‐Tzer; Zheng, Wei-Quan

doi:10.1002/mma.5982

Cited by 42 publications

(14 citation statements)

References 37 publications

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“…Different symbolic computational sets, namely Mathematica, Maple, and MATLAB, make it far simpler for physicists, mathematicians, and engineers to build a forum to develop various numerical and analytical methods range of new precise nonlinear PDE solutions. The methods of numeral evolution are the first integral technique [7] , the modified Kudryashov technique [8] , [9] , [10] , the modified extended tanh-function method [11] , [12] , the improved simple equation technique [13] , the method of characteristics [14] , the novel exponential rational function technique [15] , the semi-inverse variational principle [16] , [17] , the multiple Exp-function system [18] , [19] , the sine-cosine method [20] , the Exp-function method [17] , [21] , the improved

2

and

2

-expansion methods [22] , [23] , the modified trial equation method [24] , the extended rational trigonometric method [25] , the unified method [26] , the Darboux transform method [27] , the Adomian decomposition method [28] , the exponential rational function method [29] , the Bäcklund transformation and inverse scattering method [30] , Hirota's bilinear method [31] , the advanced exp(

)-expansion methods [32] , [33] , the extended simple equation method [32] , the extended sinh-Gordon expansion method [34] , [35] , [36] , [37] , the sine-Gordon expansion method [38] , [39] , [40] , the improved (

) and (

…”

Section: Introductionmentioning

confidence: 99%

Solitary and periodic wave solutions to the family of new 3D fractional WBBM equations in mathematical physics

Mamun

Shahen

Ananna

et al. 2021

Heliyon

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For the newly implemented 3D fractional Wazwaz-Benjamin-Bona-Mahony (WBBM) equation family, the present study explores the exact singular, solitary, and periodic singular wave solutions via the (G ′ ∕G 2 )-expansion process. In the sense of conformable derivatives, the equations considered are translated into ordinary differential equations. In spite with many trigonometric, complex hyperbolic, and rational functions, some fresh exact singular, solitary, and periodic wave solutions to the deliberated equations in fractional systems are attained by the implementation of the (G ′ ∕G 2 )-expansion technique through the computational software Mathematica. The unique solutions derived by the process defined are articulated with the arrangement of the functions tanh, sech; tan, sec; coth, cosech, and cot, cosec. With three-dimensional (3D), two dimensional (2D) and contour graphics, some of the latest solutions created have been envisaged, selecting appropriate arbitrary constraints to illustrate their physical representation. The outcomes were obtained to determine the power of the completed technique to calculate the exact solutions of the equations of the WBBM that can be used to apply the nonlinear water model in the ocean and coastal engineering. All the solutions given have been certified by replacing their corresponding equations with the computational software Mathematica.

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2

and

2

) and (

…”

Section: Introductionmentioning

confidence: 99%

Solitary and periodic wave solutions to the family of new 3D fractional WBBM equations in mathematical physics

Mamun

Shahen

Ananna

et al. 2021

Heliyon

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“…In Zeidan and Bira, 3 the authors investigate the shock‐wave structure of hyperbolic differential equations of polyatomic gases by using Lie symmetry analysis. The Adomian decomposition method is applied and analyzed in Zeidan et al 4,5 to resolve the Riemann problem and study the solution of Burgers' equation, respectively.…”

Section: Introductionmentioning

confidence: 99%

The exponential behavior of 3D stochastic primitive equations driven by fractional noise

Wang

Zhou

Guo

2021

Math Methods in App Sciences

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The long‐time behavior of flows is a very interesting and important problem in the theory of stochastic hydrodynamic equations. Inspired by the theory of dynamic system, we develop a new method to the study of the pathwise exponential behavior of 3D stochastic primitive equations driven by fractional Brownian motion. That is, we show that the weak solutions to the 3D stochastic primitive equations converge exponentially to the unique stationary solution. The result and method presented in this article can be widely applied to the study of long‐time behavior of other hydrodynamic equations with noises including Brownian motion and Lévy noise.

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“…To date, a large volume of research articles has been published to demonstrate the practicability of the technique [38]. The main benefit of the ADM is that one can employ it directly to differential and integral equations with constant or variable coefficients, which may be either linear or non-linear as well as either homogeneous or nonhomogeneous [39,40]. Another important benefit of the method is that it may reduce the size of calculation significantly while still preserving reasonably accurate numerical results over the traditional techniques [41].…”

Section: Introductionmentioning

confidence: 99%

Solving protoplanetary structure equations using Adomian decomposition method

Paul

Khatun

Nuruzzaman

et al. 2021

Heliyon

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Mathematical studies of the solution of Burgers' equations by Adomian decomposition method

Cited by 42 publications

References 37 publications

Solitary and periodic wave solutions to the family of new 3D fractional WBBM equations in mathematical physics

Solitary and periodic wave solutions to the family of new 3D fractional WBBM equations in mathematical physics

The exponential behavior of 3D stochastic primitive equations driven by fractional noise

Solving protoplanetary structure equations using Adomian decomposition method

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