A Semi-Analytical Method to Investigate Fractional-Order Gas Dynamics Equations by Shehu Transform

Shah, Rasool; Alshehry, Azzh Saad; Weera, Wajaree

doi:10.3390/sym14071458

Cited by 18 publications

(10 citation statements)

References 49 publications

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“…During the solution process, the optimization results of the previous stage are continuously used to carry out the optimization solution of the next stage. The ballast water allocation problem of rescue robots is regarded as a continuous problem, and a dynamic programming algorithm is used to solve the optimal decision 22 – 26 . The conceptual diagram of the dynamic programming algorithm is shown in Fig.…”

Section: Dynamic Programming Algorithm Modelmentioning

confidence: 99%

Optimization method and experimental research on attitude adjustment scheme of attitude adaptive rescue robot

Wang

Pan

Zhou

et al. 2022

Sci Rep

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To improve the space attitude adjustment efficiency of the robot designed in this study, the average water level height variation of each ballast tank during the rescue process and the ballast water filling mass before the rescue process are taken as optimization variables, the minimal ballasting time during rescue process as the optimisation objective, and the heel and trim inclination angle, and stability in the rescue process as the constraint conditions. For the first time, an optimization method of a rescue robot space attitude adjustment scheme based on a dynamic programming algorithm is proposed. Relevant experiments and data collection were carried out with a model robot with a physical ratio of 1:2. MATLAB simulation and model robot experimental results show that compared with an empirical scheme, the total deployment time and ballast water total allocation mass are reduced by 11.07% and 30.79%, respectively, and the heel and trim angle variation stability is increased by 4.18% and 8.67%, respectively. The optimization model and algorithm are beneficial to improve the space attitude adjustment efficiency and stability of the rescue robot in this paper, and it is also easier to transfer to other fields of ballast water allocation, which has strong practical engineering significance.

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Section: Dynamic Programming Algorithm Modelmentioning

confidence: 99%

Optimization method and experimental research on attitude adjustment scheme of attitude adaptive rescue robot

Wang

Pan

Zhou

et al. 2022

Sci Rep

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“…Hilfer-Prabhakar fractional derivatives have gained popularity among researchers due to their unique properties and ability to incorporate various integral transforms, such as Laplace, Fourier, Sumudu, Shehu, Elzaki, and Sawi, into their calculations [18], [19], [20], [21], [22], [24], [25], [26], [27], [28], [29] . Some authors applied Laplace, Sumudu, Elzaki and Shehu transforms to the Prabhakar and Hilfer-Prabhakar fractional derivatives and employed to find the solutions of some fractional differential equations in terms of Mittage-Leffler function [6], [8], [9], [10].…”

Section: Introductionmentioning

confidence: 99%

New generalized integral transform on Hilfer-Prabhakar fractional derivatives and its applications

Khalid

Alha

2023

Preprint

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In this paper, we obtain the new generalized integral transform on Prabhakar integral, Hilfer-Prabhakar derivatives and regularized Hilfer-Prabhakar fractional derivatives. Next, we evaluate the solution of some Cauchy type fractional differential equation with Hilfer-Prabhakar fractional derivatives by applying the new integral transform and Fourier transforms which involves three parameter Mittage-Leffler function.

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“…Te nonlinear gas dynamics equation is used in shock waves, centered rarifed waves, contact fows, and connection discontinuities. Te study of gas motion and its impact on structures using the principles of fuid dynamics and fuid mechanics is known as "gas dynamic," and it belongs to the discipline of fuid dynamics [1,2]. Numerous researchers has studied the gas dynamic equation with diferent analysis [3,4].…”

Section: Introductionmentioning

confidence: 99%

Analytical and Approximate Solutions of the Nonlinear Gas Dynamic Equation Using a Hybrid Approach

Nadeem

Ali

2023

Journal of Mathematics

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This paper presents the study of a numerical scheme for the analytical solution of nonlinear gas dynamic equation. We use the idea of Laplace–Carson transform and associate it with the homotopy perturbation method (HPM) for obtaining the series solution of the equation. We show that this hybrid approach is excellent in agreement and converges to the exact solution very smoothly. Further, HPM combined with He’s polynomial is utilized to minimize the numerical simulations in nonlinear conditions that make it easy for the implementation of Laplace–Carson transform. We also exhibit a few graphical solutions to indicate that this approach is extremely reliable and convenient for linear and nonlinear challenges.

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A Semi-Analytical Method to Investigate Fractional-Order Gas Dynamics Equations by Shehu Transform

Cited by 18 publications

References 49 publications

Optimization method and experimental research on attitude adjustment scheme of attitude adaptive rescue robot

Optimization method and experimental research on attitude adjustment scheme of attitude adaptive rescue robot

New generalized integral transform on Hilfer-Prabhakar fractional derivatives and its applications

Analytical and Approximate Solutions of the Nonlinear Gas Dynamic Equation Using a Hybrid Approach

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