Integral equations have been one of the most important tools in several areas of science and engineering. In this paper, we use Haar wavelet method for the numerical solution of one-dimensional and two-dimensional Fredholm integral equations of second kind. The basic idea of Haar wavelet collocation method is to convert the integral equation into a system of algebraic equations that involves a finite number of variables. The numerical results are compared with the exact solution to prove the accuracy of the Haar wavelet method
One of the key tools for many fields of applied mathematics is the integral equations. Integral equa...
The current study proposes a numerical method which solves nonlinear Fredholm and Volterra integral ...
In this paper,We use the continuous Legendre multi-wavelets on the interval [0, 1) to solve Fredholm...
Integral equations have been one of the most important tools in several areas of science and enginee...
Abstract: The main purpose of this paper is to obtain the numerical solution of linear Volterra and ...
Two-dimensional wavelets for numerical solution of integral equations Hesam-aldien Derili1*, Saeed S...
Abstract. A numerical method for solving nonlinear Fredholm integral equations, based on the Haar wa...
AbstractIn this work, we present a computational method for solving nonlinear Fredholm integral equa...
In this contest of study, problems regarding differential equations are studied when the differentia...
In this work, we present a numerical solution of nonlinear fredholm integral equations using Leibnit...
An efficient algorithm based on the Haar wavelet approach for numerical solution of linear integral ...
summary:A simple and effective method based on Haar wavelets is proposed for the solution of Pocklin...
The current study proposes a numerical method which solves nonlinear Fredholm and Volterra integral ...
AbstractThis paper presents a computational technique for Fredholm integral equation of the second k...
In recent years, wavelets have found their way into many different fields of science and engineerin...
One of the key tools for many fields of applied mathematics is the integral equations. Integral equa...
The current study proposes a numerical method which solves nonlinear Fredholm and Volterra integral ...
In this paper,We use the continuous Legendre multi-wavelets on the interval [0, 1) to solve Fredholm...
Integral equations have been one of the most important tools in several areas of science and enginee...
Abstract: The main purpose of this paper is to obtain the numerical solution of linear Volterra and ...
Two-dimensional wavelets for numerical solution of integral equations Hesam-aldien Derili1*, Saeed S...
Abstract. A numerical method for solving nonlinear Fredholm integral equations, based on the Haar wa...
AbstractIn this work, we present a computational method for solving nonlinear Fredholm integral equa...
In this contest of study, problems regarding differential equations are studied when the differentia...
In this work, we present a numerical solution of nonlinear fredholm integral equations using Leibnit...
An efficient algorithm based on the Haar wavelet approach for numerical solution of linear integral ...
summary:A simple and effective method based on Haar wavelets is proposed for the solution of Pocklin...
The current study proposes a numerical method which solves nonlinear Fredholm and Volterra integral ...
AbstractThis paper presents a computational technique for Fredholm integral equation of the second k...
In recent years, wavelets have found their way into many different fields of science and engineerin...
One of the key tools for many fields of applied mathematics is the integral equations. Integral equa...
The current study proposes a numerical method which solves nonlinear Fredholm and Volterra integral ...
In this paper,We use the continuous Legendre multi-wavelets on the interval [0, 1) to solve Fredholm...
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