An upper bound on the number of cliques in a graph

## Abstract We produce in this paper an upper bound for the number of vertices existing in a clique of maximum cardinal. The proof is based in particular on the existence of a maximum cardinal clique that contains no vertex __x__ such that the neighborhood of __x__ is contained in the neighborhood

## Abstract A graph is point determining if distinct vertices have distinct neighborhoods. The nucleus of a point‐determining graph is the set __G__^O^ of all vertices, __v__, such that __G__–__v__ is point determining. In this paper we show that the size, ω(__G__), of a maximum clique in __G__ sat

## Abstract The upper bound for the harmonious chromatic number of a graph that has been given by Sin‐Min Lee and John Mitchem is improved.

Using a technique developed by A. Nilli (1991, Discrete Math. 91, 207 210), we estimate from above the Cheeger number of a finite connected graph G of small degree (2(G) 5) admitting sufficiently distant edges. ## 2001 Academic Press Let G=(V(G), E(G)) be a finite connected graph. The Cheeger numb

An upper bound for the harmonious chromatic number of a graph G is given. Three corollaries of the theorem are theorems or improvements of the theorems of Miller and Pritikin. The assignment of colors to the vertices of a graph such that each vertex has exactly one color has been studied for well o

The kdomination number of a graph G, y k ( G ) , is the least cardinality of a set U of verticies such that any other vertex is adjacent to at least k vertices of U. We prove that if each vertex has degree at least k. then YAG) 5 kp/(k + 1).