A strengthened form of a theorem ofWiener

We consider connected, locally connected graphs in which the maximum and minimum degrees differ by a t most one and do not exceed five. It is shown that if C is a nonhamiltonian cycle in such a graph G, then there exists a cycle C' in G such that V(C) C V(C7 and IV(C')l = (V(C)I + 1. ## 1. Introduc

A. Kotzig [5] proved the following theorem (cf. B. Griinbaum [2,3,4]: Every 3-polytope has at least one edge such that the sum of valencies of its end-vertices is ~< 13. In this note we deal with improvements of this statement. Let us review first some of the notations employed: If we are given a p

We consider the central limit theorem for the probability density function \(f_{n}(x)\) of the standardized sum of independent and identically distributed random variables with finite variance and regular probability density function. By showing boundedness of different convex functionals along the