A generalization of Almansi's theorem and its application

A generalized ergo& theorem is proven for a class of statirmary random processes. According lo this theorem a strictly stationary random process with finite mean, m, and variance uz2 is strictly ergo& with probabilit~e if limr+,,Rz(r) = mz2 is sdi.s+d where R\*(r) is the probability cornelation func

## Abstract In this paper, we obtain an asymptotic generalization of Turán's theorem. We prove that if all the non‐trivial eigenvalues of a __d__‐regular graph __G__ on __n__ vertices are sufficiently small, then the largest __K__~__t__~‐free subgraph of __G__ contains approximately (__t__ − 2)/(__

Let 9 be the polyhedron given by 9 = {x E R": Nx=O, a~x~b}, where N is a totally unimodular matrix and a and 6 are any integral vectors. For x E R" let (x)' denote the vector obtained from x by changing all its negative components to zeros. Let x1, . . . , xp be the integral points in 9 and let 9+ b