A natural solution to the modal equations

## Abstract In this paper the Vekua‐Dikmen formulation of the equations of shell theory as a heirarchy are presented as a hypercomplex system. Using the function theory associated with this algebra the torsion problem is solved as an integral representation.

This paper is concerned with a generalization of a functional differential equation known as the pantograph equation. The pantograph equation contains a linear functional argument. In this paper we generalize this functional argument to include nonlinear polynomials. In contrast to the entire soluti

Abstra~-A practical approximation to the fundamental integro-differential equation for batchgrinding is presented and a solution developed. The solution is written in terms of two experimentally determined basic parameters of the system, (1) rates of breakage and (2) breakage function, and is in a f

We obtain approximations to some bound-state solutions of Sohrikiinger equations with a variety of central potentials k'(r) without any direct csiculation of the matrix elements of V(r). The method involves solutions of two algebraic eigenvalue prob lems, one for a real tridiagonal matrix, and one f