Higher-order finite elements based on generalized eigenfunctions of the Laplacian

This paper presents a new finite element formulation for the free vibration analysis of composite beams based on the third-order beam theory. This work also studies the influence of the mass components resulting from higher-order displacements on the frequencies of flexural vibration. By using Hamil

The one-dimensional Schrodinger equation has been examined by means öf the confined system defined on a finite interval. The eigenvalues of the resulting bounded problem subject to the Dirichlet boundary conditions are calculated accurately to 20 significant figures using higher order shape function

## Abstract Generalized second order differential operators of the form $ {d \over {d \mu}} {d \over {dx}} $ when __μ__ is a selfsimilar measure whose support is the classical Cantor set are considered. The asymptotic distribution of the zeros of the eigenfunctions is determined. (© 2004 WILEY‐VCH