In this article, Legendre simulated annealing, neural network (LSANN) is designed for fuzzy fractional order differential equations, which is employed on fractional fuzzy initial value problem (FFIVP) with triangular condition. Here, Legendre polynomials are used to modify the structure of neural networks with a Taylor series approximation of the tangent hyperbolic as activation function while the network adaptive coefficients are trained in the procedure of simulated annealing to optimize the residual error. The computational results are depicted in terms of numerical values to compare them with previous results
Fractional calculus has recently gained increasing interest in the economic and financial literature...
This paper deals with the solutions of fuzzy Fredholm integral equations using neural networks. Base...
AbstractThis paper deals with the solutions of fuzzy Fredholm integral equations using neural networ...
This chapter offers a numerical simulation of fractional differential equations by utilizing Chebysh...
In order to study the application of nonlinear fractional differential equations in computer artific...
To enrich any model and its dynamics introduction of delay is useful, that models a precise descript...
This paper deals with the numerical solutions of fuzzy fractional differential equations under Caput...
In this paper, we interpret a two-point initial value problem for a second order fuzzy differential...
Abstract. In this paper, a swarm intelligence technique, better known as Particle swarm optimization...
In this paper, numerical methods for solving fractional differential equations by using a triangle n...
The primary goal of this research is to propose a novel architecture for a deep neural network that ...
Abstract. In this paper, solving fuzzy ordinary differential equations of the n th order by Runge-Ku...
Abstract This paper develops a Legendre neural network method (LNN) for solving linear and nonlinear...
In this work, we introduce a generalization of the differential polynomial neural network utilizing ...
In this paper, the influence of the optimization algorithms Adam, RMSprop, L-BFGS and SGD with momen...
Fractional calculus has recently gained increasing interest in the economic and financial literature...
This paper deals with the solutions of fuzzy Fredholm integral equations using neural networks. Base...
AbstractThis paper deals with the solutions of fuzzy Fredholm integral equations using neural networ...
This chapter offers a numerical simulation of fractional differential equations by utilizing Chebysh...
In order to study the application of nonlinear fractional differential equations in computer artific...
To enrich any model and its dynamics introduction of delay is useful, that models a precise descript...
This paper deals with the numerical solutions of fuzzy fractional differential equations under Caput...
In this paper, we interpret a two-point initial value problem for a second order fuzzy differential...
Abstract. In this paper, a swarm intelligence technique, better known as Particle swarm optimization...
In this paper, numerical methods for solving fractional differential equations by using a triangle n...
The primary goal of this research is to propose a novel architecture for a deep neural network that ...
Abstract. In this paper, solving fuzzy ordinary differential equations of the n th order by Runge-Ku...
Abstract This paper develops a Legendre neural network method (LNN) for solving linear and nonlinear...
In this work, we introduce a generalization of the differential polynomial neural network utilizing ...
In this paper, the influence of the optimization algorithms Adam, RMSprop, L-BFGS and SGD with momen...
Fractional calculus has recently gained increasing interest in the economic and financial literature...
This paper deals with the solutions of fuzzy Fredholm integral equations using neural networks. Base...
AbstractThis paper deals with the solutions of fuzzy Fredholm integral equations using neural networ...