Hossein jafari biography template
Ji-huan He. Chaudry Khalique. Sheng-Da Zeng. Carlo Cattani. Bachok Taib. Hossein Jafari University of Mazandaran. Srivastava University of Victoria.
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Papers by Hossein Jafari. Abstract and Applied AnalysisMar 25, The local fractional Poisson equations in two independent variables that appear in mathematical p The approximate solutions with the nondifferentiable functions are obtained by using the local fractional variational iteration method. Download Edit. In this paper, we investigate several integral equations by using T-stability of the Homotopy perturbation method investigates for solving integral equations.
Some illustrative examples are presented to show that the Homotopy perturbation method is T-stable for solving Fredholm integral equations. The Lie symmetry approach along with The Lie symmetry approach along with the simplest equation method and the Exp-function method are used to obtain these solutions.
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As a simplest hossein jafari biography template we have used the equation of Riccati in the simplest equation method. Exact solutions obtained are travelling wave solutions. The Gaussian ansatz is used to carry out theintegration of the governing equation. The exact solutions are obtained and the constraint conditions, for the existence of these Gaussons, fall out during the course of derivation ofthe solution.
A brief discussion on Thirring solitons is also included. The biogenic amine putrescine, cadaverine, histamine and tyramine content of whole Southern Cas Initial concentrations of putrescine and cadaverine were 0. Correlations were found between putrescine and psychrotrophs, and between cadaverine and pseudomonads. Adomian decomposition: a tool for solving a system of fractional differential equations V Daftardar-Gejji, H Jafari Journal of Mathematical Analysis and Applications 2, Solving a system of nonlinear fractional differential equations using Adomian decomposition H Jafari, V Daftardar-Gejji Journal of Computational and Applied Mathematics 2, Solving linear and nonlinear fractional diffusion and wave equations by Adomian decomposition H Jafari, V Daftardar-Gejji Applied Mathematics and Computation 2, Solving a multi-order fractional differential equation using Adomian decomposition V Daftardar-Gejji, H Jafari Applied Mathematics and Computation 1, Homotopy analysis method for solving linear and nonlinear fractional diffusion-wave equation H Jafari, S Seifi Communications in Nonlinear Science and Numerical Simulation 14 5, Solving a system of nonlinear fractional partial differential equations using homotopy analysis method H Jafari, S Seifi Communications in Nonlinear Science and Numerical Simulation 14 5, Analysis of a system of nonautonomous fractional differential equations involving Caputo derivatives V Daftardar-Gejji, H Jafari Journal of Mathematical Analysis and Applications 2, Two illustrative examples has been presented.
In this paper, we present an efficient modification of the homotopy analysis method HAM that wi We then conduct a comparative study between the new modification and the homotopy analysis method. This modification of the homotopy analysis method is applied to nonlinear integral equations and mixed Volterra-Fredholm integral equations, which yields a series solution with accelerated convergence.
Numerical illustrations are investigated to show the features of the technique. The modified method accelerates the rapid convergence of the series solution and reduces the size of work. In this paper, the variational iteration method VIM is employed to obtain approximate analytica The method is capable of reducing the size of calculation and easily overcomes the difficulty of the perturbation technique or Adomian polynomials.
In this paper, the two-dimensional heat conduction equations with local fractionalderivative oper Analytical solutions are obtained by using the localfractional Adomian decomposition method. The results obtained show that the numericalmethod based on the proposed technique gives us the exact solution Illustrative examples areincluded to demonstrate the validity and applicability of the new technique.
The reduced differential transform method for the Black-Scholes pricing model of European option valuation. Finance is one of the fastest developing areas in the modern banking and corporate world. In this The same algorithm can be used for European put option. The results show that this method is very effective and simple. In this article, the local fractional variational iteration method is proposed to solve nonlinear To illustrate the ability and reliability of the method, some examples are illustrated.
A comparison between local fractional variational iteration method with the other numerical methods is given, revealing that the proposed method is capable of solving effectively a large number of nonlinear differential equations with high accuracy. In addition, we show that local fractional variational iteration method is able to solve a large class of nonlinear problems involving local fractional operators effectively, more easily and accurately, and thus it has been widely applicable in engineering and physics.
Application of fractional sub-equation method to the space-time fractional differential equations.
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The fractional sub-equation method is considered for application to the spacetime fractional Telegraph and Burgers-Huxley equations. In this paper, we consider a particle with spin 1 2 in de Sitter space-time. Procedure for transi We make the suitable second order equation corresponding to de Sitter space time for particle spine 12 we then compare this equation to Jacobi polynomial and obtain the wave function and eigenvalues energy spectrum which is important for the corresponding system.
Also, by taking the advantage from weight and main function in Jacobi polynomial and obtain the corresponding algebra. In this paper, the simplest equation method has been used for finding the general exact solutions Approximate technique for solving fractional variational problems. The purpose of this paper is to suggest a numerical technique to solve fractional variational pro These problems are based on Caputo fractional derivatives.
Rayleigh-Ritz method is used in this technique. First we approximate the objective function by the trapezoidal rule. Then, the unknown function is expanded in terms of the Bernstein polynomials.