Sawi Transform Based Homotopy Perturbation Method for Solving Shallow Water Wave Equations in Fuzzy Environment

Sahoo, Mrutyunjaya; Chakraverty, Snehashish

doi:10.3390/math10162900

Cited by 15 publications

(5 citation statements)

References 48 publications

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“…Definition 2.3 The Sawi transform is defined as [ 26 ] where ω shows the transformation variable. If ϑ (℘) is exponentially ordered and piecewise continuous, then the ST of the function ϑ ( τ ), τ ≥ 0 exists; otherwise, ST might not exist.…”

Section: Fuzzy Integral and Sawi Transformmentioning

confidence: 99%

Numerical investigation of two-dimensional fuzzy fractional heat problem with an external source variable

Nadeem,

Alotaibi,

Alotaibi

et al. 2024

PLoS ONE

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This study suggests a strategy for calculating the fuzzy analytical solutions to a two-dimensional fuzzy fractional-order heat problem including a diffusion variable connected externally. We propose Sawi residual power series scheme (SRPSS) which is the amalgamation of Sawi transform and residual power series scheme under the Caputo fractional differential operator. We demonstrate three different examples to derive the fuzzy fractional series solution which is characterized by its rapid convergence and easy finding of the unknown coefficients using the concept of limit at infinity. The most significant aspect of this scheme is that it derives the results without time effort compared with the traditional residual power series approach. Our findings confirm that the SRPSS is a robust and valuable method for approximating the solution of fuzzy fractional problems. Furthermore, we provide 2D and 3D symbolic representations to present the physical behavior of fuzzy fractional problems under the lower and upper bounded solutions.

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Section: Fuzzy Integral and Sawi Transformmentioning

confidence: 99%

Numerical investigation of two-dimensional fuzzy fractional heat problem with an external source variable

Nadeem,

Alotaibi,

Alotaibi

et al. 2024

PLoS ONE

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“…Tamboli and Tandel [ 15 ] applied reduced differential transform method for the treatment of internal atmospheric waves phenomenon. Sahoo and Chakraverty [ 16 ] used Sawi transformn based homotopy perturbation method to solve shallow-water equation in fuzzy environment. Sartanpara and Meher [ 17 ] examined the differential equation system representing the atmospheric internal waves by using q-homotopy analysis Shehu transform method.…”

Section: Introductionmentioning

confidence: 99%

A study of time-fractional model for atmospheric internal waves with Caputo-Fabrizio derivative

Vivas-Cortez,

Sadaf,

Perveen

et al. 2024

PLoS ONE

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The internal atmospheric waves are gravity waves and occur in the inner part of the fluid system. In this study, a time-fractional model for internal atmospheric waves is investigated with the Caputo-Fabrizio time-fractional differential operator. The analytical solution of the considered model is retrieved by the Elzaki Adomian decomposition method. The variation in the solution is examined for increasing order of the fractional parameter α through numerical and graphical simulations. The accuracy of the obtained results is established by comparing the obtained solution of considered fractional model with the results available in the literature.

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“…In 2019, Mahgoub et al [17] introduced a new integral transform called the Sawi transform, with the main purpose of studying its applicability for solving linear differential equations. Nowadays, the Sawi transform is widely used by researchers in science and engineering to solve various problems for integral and differential equations [24][25][26][27][28][29].…”

Section: Introductionmentioning

confidence: 99%

On Hilfer-Prabhakar fractional derivatives Sawi transform and its applications to fractional differential equations

Khalid¹,

Alha²

2023

Preprint

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The goal of this paper is to study the Sawi transform and its relationship to Hilfer-Prabhakar and regularized Hilfer-Prabhakar fractional derivatives, as well as to present some lemmas related to the Sawi transform. Additionally, the paper aims to find solutions for Cauchy type fractional differential equations using Hilfer-Prabhakar fractional derivatives, by utilizing the Sawi and Fourier transforms, and involving the threeparameter Mittag-Leffler function.

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Sawi Transform Based Homotopy Perturbation Method for Solving Shallow Water Wave Equations in Fuzzy Environment

Cited by 15 publications

References 48 publications

Numerical investigation of two-dimensional fuzzy fractional heat problem with an external source variable

Numerical investigation of two-dimensional fuzzy fractional heat problem with an external source variable

A study of time-fractional model for atmospheric internal waves with Caputo-Fabrizio derivative

On Hilfer-Prabhakar fractional derivatives Sawi transform and its applications to fractional differential equations

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