This thesis presents a new class of collocation methods for the approximate numerical solution of linear parabolic partial differential equations. In the time dimension, the partial derivative with respect to time is replaced by finite differences, to form the implicit Euler method. At each time step, a polynomial approximating the exact solution is calculated for each triangular finite element created by the Rivara algorithm. Polynomials of adjacent finite elements have matching values and matching normal derivatives at a set of discrete points, called "matching points". The method of nested dissection is used to eliminate all variables at the interior matching points of the domain. The maximum error of the solution is of the order of the ...
Hyperbolic partial differential equations are frequently referenced in modeling real-world problems ...
We set an algorithm for the numerical resolution of parabolic problems combining the finite element ...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
We report a new numerical algorithm for solving one-dimensional linear parabolic partial differentia...
In this thesis, we present an implementation of a novel collocation method for solving nonlinear par...
Collocation at Gaussian points for a scalar m'th order ordinary differential equation has heen studi...
An efficient technique for solving parabolic partial integrodifferential equation is presented. This...
AbstractThis article contributes a numerical scheme for finding approximate solutions of one-dimensi...
Lagrange interpolation formulae are used to obtain a new algorithm for the approximate polynomial so...
This article contributes a numerical scheme for finding approximate solutions of one-dimensional par...
. We are investigating a method to solve parabolic equations using domain decomposition techniques. ...
The thesis commences with a description and classification of partial differential equations and the...
A collocation method based on linear Legendre multiwavelets is developed for numerical solution of o...
Abstract: The different computational methods for 2D parabolic boundary problems have been...
Hyperbolic partial differential equations are frequently referenced in modeling real-world problems ...
We set an algorithm for the numerical resolution of parabolic problems combining the finite element ...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
We report a new numerical algorithm for solving one-dimensional linear parabolic partial differentia...
In this thesis, we present an implementation of a novel collocation method for solving nonlinear par...
Collocation at Gaussian points for a scalar m'th order ordinary differential equation has heen studi...
An efficient technique for solving parabolic partial integrodifferential equation is presented. This...
AbstractThis article contributes a numerical scheme for finding approximate solutions of one-dimensi...
Lagrange interpolation formulae are used to obtain a new algorithm for the approximate polynomial so...
This article contributes a numerical scheme for finding approximate solutions of one-dimensional par...
. We are investigating a method to solve parabolic equations using domain decomposition techniques. ...
The thesis commences with a description and classification of partial differential equations and the...
A collocation method based on linear Legendre multiwavelets is developed for numerical solution of o...
Abstract: The different computational methods for 2D parabolic boundary problems have been...
Hyperbolic partial differential equations are frequently referenced in modeling real-world problems ...
We set an algorithm for the numerical resolution of parabolic problems combining the finite element ...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...