Your search keyword '"Baskonus, Haci Mehmet"' showing total 13 results

1. On the implementation of fractional homotopy perturbation transform method to the Emden–Fowler equations.

Author

Kumar, Ajay, Prasad, Raj Shekhar, Baskonus, Haci Mehmet, and Guirao, Juan Luis Garcia

Abstract

In this paper, we use the homotopy perturbation transform method (HPTM) to offer an efficient semi-analytical technique for solving fractional Emden–Fowler equations. A mixture of Laplace transform, Caputo–Fabrizio derivative, and homotopy perturbation transformation process has the projected technique. To assess the efficacy of the suggested technique, test examples have been provided. The series have been used to represent semi-analytical solutions. Also, covered have the convergence position, estimation, and semi-analytical simulation results. The HPTM efficiently managed and controlled a series solution that quickly converges to a precise result in a narrow admissible region. The new findings essentially improve and simplify some of the previously published findings (see Malagia in Math. Comput. Simul. 190:362, 2021). By assigning appropriate values to free parameters, dynamical wave structures of some semi-analytical solutions are graphically demonstrated using 2-dimensional and 3-dimensional figures. Furthermore, various simulations are used to demonstrate the physical behaviors of the acquired solution with respect to fractional integer order. [ABSTRACT FROM AUTHOR]

Published

2023

2. The natural transform decomposition method for linear and nonlinear partial differential equations.

Author

Baskonus, Haci Mehmet, Bulut, Hasan, and Pandir, Yusuf

Subjects

*PARTIAL differential equations, *DECOMPOSITION method, *BURGERS' equation, *LAPLACE transformation, *ANALYTICAL solutions

Abstract

In this paper, we study the analytical solutions of linear and nonlinear partial differential equations by Natural Transform Decomposition Method (NTDM) which is formed by combining Natural Transform Method and Decomposition Method. Then, we have plotted 2D and 3D graphics of these equations by means of programming language Mathematica 7. [ABSTRACT FROM AUTHOR]

Published

2014

3. Regarding new numerical solution of fractional Schistosomiasis disease arising in biological phenomena.

Author

Veeresha, P., Baskonus, Haci Mehmet, Prakasha, D.G., Gao, Wei, and Yel, Gulnur

Subjects

*PHENOMENOLOGICAL biology, *SCHISTOSOMIASIS, *PARASITIC diseases, *FRACTIONAL differential equations, *CAPUTO fractional derivatives

Abstract

In this paper, we study to find the numerical solution of fractional Schistosomiasis disease by using a numerical method. Fractional Schistosomiasis disease model is used to symbolize a parasitic disease caused by trematode flukes of the genus Schistosoma. The physical behaviour of results obtained by using q - homotopy analyses transform method (q-HATM) in terms of plots for different fractional-order is captured. The results obtained by using considered method is more effective and easy to apply in order to examine the nature of multi-dimensional differential equations of fractional order arising in biological disease. [ABSTRACT FROM AUTHOR]

Published

2020

4. An efficient analytical approach for fractional Lakshmanan‐Porsezian‐Daniel model.

Author

Veeresha, Pundikala, Prakasha, Doddabhadrappla Gowda, Baskonus, Haci Mehmet, and Yel, Gulnur

Subjects

*FRACTIONAL differential equations, *LAPLACE transformation, *FRACTIONAL calculus, *CAPUTO fractional derivatives

Abstract

In this paper, the q‐homotopy analysis transform method (q‐HATM) is applied to find the solution for the fractional Lakshmanan‐Porsezian‐Daniel (LPD) model. The LPD model is the generalization of the non‐linear Schrödinger (NLS) equation. The proposed method is graceful fusions of Laplace transform technique with q‐homotopy analysis scheme, and the derivative is considered in Caputo sense. In order to validate and illustrate the efficiency of the proposed method, we analysed the projected model in terms of fractional order. Moreover, the physical behaviour of the obtained solution has been captured for the three different cases in terms of 3D and contour plots for diverse values of the fractional order. The obtained results confirm that the future method is easy to implement, highly methodical, and very effective to analyse the behaviour of complex non‐linear fractional differential equations exist in the connected areas of science and engineering. [ABSTRACT FROM AUTHOR]

Published

2020

5. Fractional differential equations related to an integral operator involving the incomplete I‐function as a kernel.

Author

Bhatter, Sanjay, Kumawat, Shyamsunder, Jangid, Kamlesh, Purohit, S. D., and Baskonus, Haci Mehmet

Subjects

*INTEGRAL operators, *INTEGRAL equations, *FRACTIONAL integrals, *MATHEMATICAL physics, *VOLTERRA equations, *FRACTIONAL differential equations

Abstract

In this study, we present and examine a fractional integral operator with an I$$ I $$‐function in its kernel. This operator is used to solve several fractional differential equations (FDEs). FDE has a set of particular cases whose solutions represent different physical phenomena. Much mathematical physics, biology, engineering, and chemistry problems are identified and solved using FDE. We first solve the FDE and the integral operator for the incomplete I$$ I $$‐function (I I$$ I $$F) for the generalized composite fractional derivative (GCFD). This is followed by the discovery and investigation of several important exceptional cases. The significant finding of this study is a first‐order integer‐differential equation of the Volterra type that clearly describes the unsaturated nature of free‐electron lasers. [ABSTRACT FROM AUTHOR]

Published

2023

6. Analysis of a mathematical model of the aggregation process of cellular slime mold within the frame of fractional calculus.

Author

Veeresha, P., Prakasha, D. G., Baishya, Chandrali, and Baskonus, Haci Mehmet

Abstract

The pivotal aim of the present study is to find the solution for a nonlinear system describing the aggregation process of cellular slime mold by using q -homotopy analysis transform method. The coupled system is considered within the frame of the Caputo fractional operator. We examine three different cases with distinct values of sensitivity function χ ρ = 1 , ρ and ρ 2 to exemplify the efficiency and applicability of the considered scheme. We capture the nature of the obtained results with respect to the fractional order, with distinct initial conditions, and illustrate them using 2D and 3D plots for particular values of the parameters. The considered scheme offers parameters, which help to adjust the convergence region, and we plotted the ℏ-curves to dissipate the effect in the present framework. Moreover, some simulating and important behavior of the considered model using attained results shows the prominence of the hired operator while analyzing the coupled equations and confirms the competence of the projected scheme. [ABSTRACT FROM AUTHOR]

Published

2023

7. Solving smoking epidemic model of fractional order using a modified homotopy analysis transform method.

Author

Veeresha, P., Prakasha, D. G., and Baskonus, Haci Mehmet

Subjects

*NONLINEAR differential equations, *ANALYTICAL solutions, *FRACTIONAL differential equations, *CAPUTO fractional derivatives

Abstract

The pivotal aim of the present work is to obtain an approximated analytical solution for the fractional smoking epidemic model with the aid of a novel technique called q-homotopy analysis transform method (q-HATM). The considered nonlinear mathematical model has been effectively employed to elucidate the evolution of smoking in a population and its impact on public health in a community. We find some new approximate solutions in a series form, which converges rapidly, and the proposed algorithm provides auxiliary parameters, which are very reliable and feasible in controlling the convergence of obtained approximate solutions. Further, we present novel simulations for all cases of results to validate the applicability and effectiveness of proposed scheme. The outcomes of the study reveal that the q-HATM is computationally very effective to analyse nonlinear fractional differential equations arises in daily life problems. [ABSTRACT FROM AUTHOR]

Published

2019

8. Novel simulations to the time-fractional Fisher's equation.

Author

Veeresha, P., Prakasha, D. G., and Baskonus, Haci Mehmet

Subjects

*NONLINEAR differential equations, *FRACTIONAL differential equations, *EQUATIONS, *FISHERS

Abstract

In the present work, an efficient numerical technique, called q-homotopy analysis transform method (briefly, q -HATM), is applied to nonlinear Fisher's equation of fractional order. The homotopy polynomials are employed, in order to handle the nonlinear terms. Numerical examples are illustrated to examine the efficiency of the proposed technique. The suggested algorithm provides the auxiliary parameters ħ and n , which help us to control and adjust the convergence region of the series solution. The outcomes of the study reveal that the q -HATM is computationally very effective and accurate to analyse nonlinear fractional differential equations. [ABSTRACT FROM AUTHOR]

Published

2019

9. REGARDING NEW NUMERICAL RESULTS FOR THE DYNAMICAL MODEL OF ROMANTIC RELATIONSHIPS WITH FRACTIONAL DERIVATIVE.

Author

GAO, WEI, VEERESHA, P., PRAKASHA, D. G., and BASKONUS, HACI MEHMET

Abstract

The main purpose of the present investigation is to find the solution of fractional coupled equations describing the romantic relationships using q -homotopy analysis transform method (q -HATM). The considered scheme is a unification of q -homotopy analysis technique with Laplace transform (LT). More preciously, we scrutinized the behavior of the obtained solution for the considered model with fractional-order, in order to elucidate the effectiveness of the proposed algorithm. Further, for the different fractional-order and parameters offered by the considered method, the physical natures have been apprehended. The obtained consequences evidence that the proposed method is very effective and highly methodical to study and examine the nature and its corresponding consequences of the system of fractional order differential equations describing the real word problems. [ABSTRACT FROM AUTHOR]

Published

2022

10. New numerical simulation for fractional Benney–Lin equation arising in falling film problems using two novel techniques.

Author

Gao, Wei, Veeresha, Pundikala, Prakasha, Doddabhadrappla Gowda, and Baskonus, Haci Mehmet

Subjects

*FALLING films, *NONLINEAR differential equations, *COMPUTER simulation, *DECOMPOSITION method, *LIQUID films

Abstract

The pivotal aim of the present work is to find the numerical solution for fractional Benney–Lin equation by using two efficient methods, called q‐homotopy analysis transform method and fractional natural decomposition method. The considered equation exemplifies the long waves on the liquid films. Projected methods are distinct with solution procedure and they are modified with different transform algorithms. To illustrate the reliability and applicability of the considered solution procedures we consider eight special cases with different initial conditions. The fractional operator is considered in Caputo sense. The achieved results are drowned through two and three‐dimensional plots for different Brownian motions and classical order. The numerical simulations are presented to ensure the efficiency of considered techniques. The behavior of the obtained results for distinct fractional order is captured in the present framework. The outcomes of the present investigation show that, the considered schemes are efficient and powerful to solve nonlinear differential equations arise in science and technology. [ABSTRACT FROM AUTHOR]

Published

2021

11. ITERATIVE METHOD APPLIED TO THE FRACTIONAL NONLINEAR SYSTEMS ARISING IN THERMOELASTICITY WITH MITTAG-LEFFLER KERNEL.

Author

GAO, WEI, VEERESHA, P., PRAKASHA, D. G., SENEL, BILGIN, and BASKONUS, HACI MEHMET

Subjects

*THERMOELASTICITY, *NONLINEAR equations, *NONLINEAR systems, *NONLINEAR differential equations, *LAPLACE transformation, *Q technique

Abstract

In this paper, we study on the numerical solution of fractional nonlinear system of equations representing the one-dimensional Cauchy problem arising in thermoelasticity. The proposed technique is graceful amalgamations of Laplace transform technique with q -homotopy analysis scheme and fractional derivative defined with Atangana–Baleanu (AB) operator. The fixed-point hypothesis is considered in order to demonstrate the existence and uniqueness of the obtained solution for the proposed fractional order model. In order to illustrate and validate the efficiency of the future technique, we consider three different cases and analyzed the projected model in terms of fractional order. Moreover, the physical behavior of the obtained solution has been captured in terms of plots for diverse fractional order, and the numerical simulation is demonstrated to ensure the exactness. The obtained results elucidate that the proposed scheme is easy to implement, highly methodical as well as accurate to analyze the behavior of coupled nonlinear differential equations of arbitrary order arisen in the connected areas of science and engineering. [ABSTRACT FROM AUTHOR]

Published

2020

12. An efficient technique for a fractional-order system of equations describing the unsteady flow of a polytropic gas.

Author

Veeresha, P, Prakasha, D G, and Baskonus, Haci Mehmet

Subjects

*GAS flow, *FRACTIONAL differential equations, *NONLINEAR equations, *EQUATIONS, *UNSTEADY flow, *ANALYTICAL solutions

Abstract

In the present investigation, the q-homotopy analysis transform method (q-HATM) is applied to find approximated analytical solution for the system of fractional differential equations describing the unsteady flow of a polytropic gas. Numerical simulation has been conducted to prove that the proposed technique is reliable and accurate, and the outcomes are revealed using plots and tables. The comparison between the obtained solutions and the exact solutions shows that the proposed method is efficient and effective in solving nonlinear complex problems. Moreover, the proposed algorithm controls and manipulates the obtained series solution in a huge acceptable region in an extreme manner and it provides us a simple procedure to control and adjust the convergence region of the series solution. [ABSTRACT FROM AUTHOR]

Published

2019

13. New Numerical Results for the Time-Fractional Phi-Four Equation Using a Novel Analytical Approach.

Author

Gao, Wei, Veeresha, Pundikala, Prakasha, Doddabhadrappla Gowda, Baskonus, Haci Mehmet, and Yel, Gulnur

Subjects

*BIOPHYSICS, *LAPLACE transformation, *MORPHOLOGY, *EQUATIONS, *NUCLEAR physics, *CAPUTO fractional derivatives

Abstract

This manuscript investigates the fractional Phi-four equation by using q -homotopy analysis transform method (q -HATM) numerically. The Phi-four equation is obtained from one of the special cases of the Klein-Gordon model. Moreover, it is used to model the kink and anti-kink solitary wave interactions arising in nuclear particle physics and biological structures for the last several decades. The proposed technique is composed of Laplace transform and q -homotopy analysis techniques, and fractional derivative defined in the sense of Caputo. For the governing fractional-order model, the Banach's fixed point hypothesis is studied to establish the existence and uniqueness of the achieved solution. To illustrate and validate the effectiveness of the projected algorithm, we analyze the considered model in terms of arbitrary order with two distinct cases and also introduce corresponding numerical simulation. Moreover, the physical behaviors of the obtained solutions with respect to fractional-order are presented via various simulations. [ABSTRACT FROM AUTHOR]

Published

2020