On Some Finite Difference Inequalities in Two Independent Variables

## I. fntFoduction Let {X,,, n 2 1) be a sequence of independent random variables, P, and f, the distribution function and the characteristic fundion of the X,, respectively. Let us put SN = 2 X,, where N is a pasitive integer-valued random variable independent of X,, ?t 2 1. Furthermore, let { P,

## An additive form of the Landau inequality for is proved for 0<c (cos(?Â2n)) &2 , 1 m n&1, with equality for , where T n is the Chebyshev polynomial. From this follows a sharp multiplicative inequality, For these values of \_, the result confirms Karlin's conjecture on the Landau inequality f

A Gauss-Galerkin finite-difference method is proposed for the numerical solution of a class of linear, singular parabolic partial differential equations in two space dimensions. The method generalizes a Gauss-Galerkin method previously used for treating similar singular parabolic partial differentia

## Abstract The problem of generation of surplus displacement variables in general purpose finite element codes, using the displacement method, is discussed. A method of automatic selection of independent variables is proposed which eliminates abortive computer runs from this source and saves engin