AbstractIn this paper we study the numerical solutions to parabolic Volterra integro-differential equations in one-dimensional bounded and unbounded spatial domains. In a bounded domain, the given parabolic Volterra integro-differential equation is converted to two equivalent equations. Then, a Legendre-collocation method is used to solve them and finally a linear algebraic system is obtained. For an unbounded case, we use the algebraic mapping to transfer the problem on a bounded domain and then apply the same presented approach for the bounded domain. In both cases, some numerical examples are presented to illustrate the efficiency and accuracy of the proposed method
In this paper, we present the Taylor polynomial solutions of system of higher order linear integro-d...
In this article, we present a new numerical method to solve the integro-differential equations (IDEs...
AbstractIf a first-order Volterra integro-differential equation is solved by collocation in the spac...
AbstractIn this paper we study the numerical solutions to parabolic Volterra integro-differential eq...
We investigate an efficient numerical method for solving a class of nonlinear Volterra integro-diffe...
AbstractIn this paper we study the numerical solution of parabolic Volterra integro-differential equ...
An efficient iteration method is introduced and used for solving a type of system of nonlinear Volte...
The problem of solving several types of one-dimensional parabolic partial differential equations (PD...
Abstract We provide the numerical solution of a Volterra integro-differential equation of parabolic ...
This work is concerned with solving parabolic Volterra partial integro-differential equations (PIDE)...
The spatial discretization of initial-value problems for (nonlinear) parabolic or hyperbolic PDEs wi...
. We are investigating a method to solve parabolic equations using domain decomposition techniques. ...
Abstract Volterra integro-differential equations arise in the modeling of natural systems where the ...
İntegro-diferansiyel denklemlerin nümerik çözümleri konusundaki çalışmaların birleşimi olan bu çalış...
In this paper, a collocation method using sinc functions and Chebyshev wavelet method is implemented...
In this paper, we present the Taylor polynomial solutions of system of higher order linear integro-d...
In this article, we present a new numerical method to solve the integro-differential equations (IDEs...
AbstractIf a first-order Volterra integro-differential equation is solved by collocation in the spac...
AbstractIn this paper we study the numerical solutions to parabolic Volterra integro-differential eq...
We investigate an efficient numerical method for solving a class of nonlinear Volterra integro-diffe...
AbstractIn this paper we study the numerical solution of parabolic Volterra integro-differential equ...
An efficient iteration method is introduced and used for solving a type of system of nonlinear Volte...
The problem of solving several types of one-dimensional parabolic partial differential equations (PD...
Abstract We provide the numerical solution of a Volterra integro-differential equation of parabolic ...
This work is concerned with solving parabolic Volterra partial integro-differential equations (PIDE)...
The spatial discretization of initial-value problems for (nonlinear) parabolic or hyperbolic PDEs wi...
. We are investigating a method to solve parabolic equations using domain decomposition techniques. ...
Abstract Volterra integro-differential equations arise in the modeling of natural systems where the ...
İntegro-diferansiyel denklemlerin nümerik çözümleri konusundaki çalışmaların birleşimi olan bu çalış...
In this paper, a collocation method using sinc functions and Chebyshev wavelet method is implemented...
In this paper, we present the Taylor polynomial solutions of system of higher order linear integro-d...
In this article, we present a new numerical method to solve the integro-differential equations (IDEs...
AbstractIf a first-order Volterra integro-differential equation is solved by collocation in the spac...