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Fuzzy Fractional Differential Equation

Solving Fuzzy Fractional Differential Equation with Fuzzy Laplace Transform Involving Sine function

Solving Fuzzy Fractional Differential Equation with Fuzzy Laplace Transform Involving Sine function

... with fuzzy Laplace transforms to obtain the solution of fuzzy fractional differential equation (FFDEs) under Riemann Liouville H-differentiability with fractional order (0 < ...

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Solving Fuzzy Fractional Differential Equation with Fuzzy Laplace Transform Involving Coshx

Solving Fuzzy Fractional Differential Equation with Fuzzy Laplace Transform Involving Coshx

... of fuzzy fractional differential equation (FFDEs) under Riemann Liouville H-differentiability using fuzzy Laplace ...solve fractional differential equation ...

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ON THE SOLUTIONS OF FUZZY FRACTIONAL DIFFERENTIAL EQUATION

ON THE SOLUTIONS OF FUZZY FRACTIONAL DIFFERENTIAL EQUATION

... of fuzzy fractional differential equation, in the sense of Caputo Hukuhara differentiability, with a fuzzy condition are constructed by using the fuzzy Laplace ...the fuzzy ...

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Approximate Solution of Fuzzy Fractional Differential Equations

Approximate Solution of Fuzzy Fractional Differential Equations

... In the present paper we propose a method for computing approximations of solution of a Fuzzy Fractional Differential Equation (FFDE) using Variational Iteration Method (VIM). The vari- ational ...

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A Jacobi operational matrix for solving a fuzzy linear fractional differential equation

A Jacobi operational matrix for solving a fuzzy linear fractional differential equation

... Orthogonal functions have received noticeable consideration in dealing with various problems. The main advantage behind the approach using this method is that it reduces these problems to those of solving a system of ...

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A Method for Solving Fuzzy Partial Differential Equation by Fuzzy Separation Variable

A Method for Solving Fuzzy Partial Differential Equation by Fuzzy Separation Variable

... Fuzzy differential equations have been applied extensively in recent years to model uncertainty in mathematical ...models. Fuzzy transport equation is one of the simplest Fuzzy partial ...

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Nontrivial solutions for a higher fractional differential equation with fractional multi-point boundary conditions

Nontrivial solutions for a higher fractional differential equation with fractional multi-point boundary conditions

... derivatives of unknown functions. Thus, the aim of this paper is to establish the exis- tence and uniqueness of nontrivial solutions for the higher nonlocal fractional differential equations (.) where nonlinear ...

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Application of fractional-order Bernoulli functions for solving fractional Riccati differential equation

Application of fractional-order Bernoulli functions for solving fractional Riccati differential equation

... of fractional order integration and its applications in solving the fractional order differential equations, ...linear fractional differential equations with variable coefficients in ...

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Linear fractional fuzzy differential equations with Caputo derivative

Linear fractional fuzzy differential equations with Caputo derivative

... linear fuzzy fractional differential equations under Caputo sense and present the explicit solutions of this problem in the general ...of fuzzy calculus, fractional calculus and ...

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Approximate Solution for Fuzzy Differential Algebraic Equations of Fractional Order Using Fractional Differential Transform Method

Approximate Solution for Fuzzy Differential Algebraic Equations of Fractional Order Using Fractional Differential Transform Method

... Piston-Ring Assembly (a) Equivalent Stresses (von-misses) (b) Result Maximum shear stress (c) frictional Stress Acting on Bronze Piston Ring (d) Sliding distance occur during the operat[r] ...

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Numerical Solution of Fuzzy Differential
Equation (FDE)

Numerical Solution of Fuzzy Differential Equation (FDE)

... of fuzzy set was first introduced by Zadeh ...of fuzzy differential equations plays an important role in modelling of science and engineering problems because this theory represents a natural way to ...

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Exact solutions for fractional partial differential equations by a new fractional sub equation method

Exact solutions for fractional partial differential equations by a new fractional sub equation method

... new fractional sub-equation method for finding exact solutions of fractional partial differential equations (FPDEs) in the sense of modified Riemann-Liouville derivative, which is the fractional ...

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Analytic Solution of Linear Fractional Differential Equation Using Fractional Laplace Transform

Analytic Solution of Linear Fractional Differential Equation Using Fractional Laplace Transform

... Definition 2.5. (Fractional Laplace Transform) If a function f(t) is defined for all positive values of the variable t and if E @ W N (−s N t N )f(t)(dt) N exists and is equal to (s) , then F(s) is called the ...

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A new fractional Jacobi elliptic equation method for solving fractional partial differential equations

A new fractional Jacobi elliptic equation method for solving fractional partial differential equations

... where the contained fractional derivative is the modified Riemann-Liouville derivative. The corresponding integer order equation to () can be found in [, ]. Now we will apply the described method in ...

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Iterative algorithm and estimation of solution for a fractional order differential equation

Iterative algorithm and estimation of solution for a fractional order differential equation

... on fractional order equations with nonlocal Riemann-Stieltjes integral boundary conditions, and no work has been done concerning the iterative algorithm of solutions of Equation ...

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A fractional differential equation model for continuous glucose monitoring data

A fractional differential equation model for continuous glucose monitoring data

... and fractional-order stochastic fits, we find that if a Wiener (Brownian motion) term is used for the stochastic term, then the KDE approximation method gives variances σ G that are very small and fits that are close ...

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On a nonlinear fractional differential equation on partially ordered metric spaces

On a nonlinear fractional differential equation on partially ordered metric spaces

... In this manuscript, by making use of fixed point techniques on ordered metric spaces, the existence and uniqueness of the solution of a nonlinear fractional differential equation with periodic and ...

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A Novel Numerical Method for Riemann Liouville Fractional Differential Equation

A Novel Numerical Method for Riemann Liouville Fractional Differential Equation

... [13] G.H. Gao, Z.Z. Sun, The finite difference approximation for a class of fractional sub-diffusion equations on a space unbounded domain. Journal of Computational Physics. 236, 1(2013) 443-460. [14] M.R. Cui, ...

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Uniqueness and existence of positive solutions for the fractional integro-differential equation

Uniqueness and existence of positive solutions for the fractional integro-differential equation

... For the past few decades, many researchers have tried to model real processes using the fractional calculus. In the mathematical context, several interesting results about the existence of positive solutions for ...

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A Generalized Fractional Power Series for Solving a Class of Nonlinear Fractional Integro-Differential Equation

A Generalized Fractional Power Series for Solving a Class of Nonlinear Fractional Integro-Differential Equation

... A Generalized Fractional Power Series for Solving a Class of Nonlinear Fractional Integro-Differential Equation.. Sirunya Thanompolkrang 1 and Duangkamol Poltem 1,2, *.[r] ...

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