Eigenfunction expansions for some nonselfadjoint operators and the transport equation

## Abstract We offer a new proof of a special Tauberian theorem for Fourier type integrals. This Tauberian theorem was already considered by us in the papers [1] and [2]. The idea of our initial proof was simple, but the details were complicated because we used Bochner's definition of generalized F

In this work we consider the eigenfunction V , t satisfying a condition at Ž . infinity of a singular second order differential operator on 0, qϱ . We give an < < asymptotic expansion of this solution with respect to the variable as ª qϱ, which permits us to establish a generalized Schlafli integral

## Abstract In the last decade or so finite element techniques have been applied with increased frequency to contaminant transport problems. Whereas most of the attention has focused on finite element approximations of spatial derivatives, standard finite difference techniques are generally used fo

In parts 1 and 2 of this series it has been suggested that ion transport, through cement based materials, can properly be described only by using a combination of Nernst, Nernst-Planck and the electrical double-layer diffusion processes. In this part experimental evidence, from diffusivity measureme