Add to ORKGgrantor: University of TorontoThis thesis presents numerical methods for the solution of general linear fourth-order boundary value problems in one dimension. The methods are based on quartic splines and the collocation discretization methodology with the midpoints of a uniform partition being the collocation points. The standard quartic-spline collocation method is second order. Two sixth-order quartic-spline collocation methods are developed and analyzed. They are both based on a high order perturbation of the differential equation and boundary conditions operators. The error analysis follows the Green's function approach and shows that both methods exhibit optimal order of convergence, that is, they are locally sixth order on t...
In this article, a fourth order quintic spline method has been developed to obtain numerical solutio...
The research presented in this dissertation is aimed at the development of family of numerical solut...
BS methods are a recently introduced class of Boundary Value Methods which is based on B-splines and...
grantor: University of TorontoThis thesis presents numerical methods for the solution of g...
AbstractThis paper derives via uniform quartic polynomial splines a few new consistency relations co...
In this article, a fourth order quartic spline method has been developed to obtain the numerical sol...
AbstractIn this paper, we use uniform quartic polynomial splines to develop a new method, which is u...
In this work, we have proposed a new quartic Bspline (QBS) approximation technique for numerical tre...
Abstract: Collocation method with sixth degree B-splines as basis functions has been developed to so...
The following two types of problems in differential equations are investigated:(i) Second and sixth-...
AbstractA numerical method based on B-spline is developed to solve the general nonlinear two-point b...
A fourth-order accurate orthogonal spline collocation scheme is formulated to approximate linear two...
Abstract.In this work the collocation method based on quartic B-spline is developed and applied to t...
grantor: University of TorontoWe consider Quadratic Spline Collocation (QSC) methods for ...
Singularly perturbed boundary value problems are solved using various techniques. The spline of deg...
In this article, a fourth order quintic spline method has been developed to obtain numerical solutio...
The research presented in this dissertation is aimed at the development of family of numerical solut...
BS methods are a recently introduced class of Boundary Value Methods which is based on B-splines and...
grantor: University of TorontoThis thesis presents numerical methods for the solution of g...
AbstractThis paper derives via uniform quartic polynomial splines a few new consistency relations co...
In this article, a fourth order quartic spline method has been developed to obtain the numerical sol...
AbstractIn this paper, we use uniform quartic polynomial splines to develop a new method, which is u...
In this work, we have proposed a new quartic Bspline (QBS) approximation technique for numerical tre...
Abstract: Collocation method with sixth degree B-splines as basis functions has been developed to so...
The following two types of problems in differential equations are investigated:(i) Second and sixth-...
AbstractA numerical method based on B-spline is developed to solve the general nonlinear two-point b...
A fourth-order accurate orthogonal spline collocation scheme is formulated to approximate linear two...
Abstract.In this work the collocation method based on quartic B-spline is developed and applied to t...
grantor: University of TorontoWe consider Quadratic Spline Collocation (QSC) methods for ...
Singularly perturbed boundary value problems are solved using various techniques. The spline of deg...
In this article, a fourth order quintic spline method has been developed to obtain numerical solutio...
The research presented in this dissertation is aimed at the development of family of numerical solut...
BS methods are a recently introduced class of Boundary Value Methods which is based on B-splines and...