AbstractAsymptotic correction, at negligible extra cost, greatly improves the accuracy of higher eigenvalues computed by finite difference or finite element methods, and generally increases the accuracy of the lower ones as well. This paper gives a brief overview of the technique and describes how its previous use with Numerov's method may be extended to problems with natural boundary conditions. Numerical results indicate that it is just as successful as with Dirichlet boundary conditions
The paper provides new expansions of leading eigenvalues for −u = u in S with the Dirichlet boundary...
It is well known that the algebraic approximations to eigenvalues of a Sturm-Liouville problem by th...
Recently, a class of Boundary Value Methods (BVMs) has been introduced for the estimation of the eig...
AbstractAsymptotic correction, at negligible extra cost, greatly improves the accuracy of higher eig...
Asymptotic correction, first studied systematically in the 1979 ANU thesis of John Paine, can sign...
The error in the estimate of the kth eigenvalue of ?y??+qy=?y, y(0)=y(?)=0, obtained by Numerov's me...
In this paper a class of Boundary Value Methods obtained as an extension of the Numerov's method is ...
Boundary Value Methods generalizing the Numerov's method are here proposed for the numerical approxi...
For computing approximations for the eigenvalues of Sturm-Liouville problems, Numerov's method and o...
Asymptotic correction was first used by Paine, de Hoog and Anderssen to improve the accuracy of fini...
The paper provides new expansions of leading eigenvalues for −u = u in S with the Dirichlet boundary...
It is well known that the algebraic approximations to eigenvalues of a Sturm-Liouville problem by th...
Recently, a class of Boundary Value Methods (BVMs) has been introduced for the estimation of the eig...
AbstractAsymptotic correction, at negligible extra cost, greatly improves the accuracy of higher eig...
Asymptotic correction, first studied systematically in the 1979 ANU thesis of John Paine, can sign...
The error in the estimate of the kth eigenvalue of ?y??+qy=?y, y(0)=y(?)=0, obtained by Numerov's me...
In this paper a class of Boundary Value Methods obtained as an extension of the Numerov's method is ...
Boundary Value Methods generalizing the Numerov's method are here proposed for the numerical approxi...
For computing approximations for the eigenvalues of Sturm-Liouville problems, Numerov's method and o...
Asymptotic correction was first used by Paine, de Hoog and Anderssen to improve the accuracy of fini...
The paper provides new expansions of leading eigenvalues for −u = u in S with the Dirichlet boundary...
It is well known that the algebraic approximations to eigenvalues of a Sturm-Liouville problem by th...
Recently, a class of Boundary Value Methods (BVMs) has been introduced for the estimation of the eig...