A note on chromatic blending of colour clusters

Abstract

For a colour cluster =(C1,C2, C3,…,C), Ci is a colour class, and |Ci|=ri ≥ 1, we investigate a simple connected graph structure G, which represents a graphical embodiment of the colour cluster such that the chromatic number (G)= , and the number of edges is a maximum, denoted +(G). We also extend the study by inducing new colour clusters recursively by blending the colours of all pairs of adjacent vertices. Recursion repeats until a maximal homogeneous blend between all colours is obtained. This is called total chromatic blending. Total chromatic blending models for example, total genetic, chemical, cultural or social orderliness integration.