Annihilator graph of the ring CP(X)

Abstract

In this article, we introduce the annihilator graph of the ring CP(X), denoted by AG(CP(X)) and observe the effect of the underlying Tychonoff space X on various graph properties of AG(CP(X)). AG(CP(X)), in general, lies between the zero divisor graph and weakly zero divisor graph of CP(X) and it is proved that these three graphs coincide if and only if the cardinality of the set of all P-points, XP is ≤ 2. Identifying a suitable induced subgraph of AG(CP(X)), called G(CP(X)), we establish that both AG(CP(X)) and G(CP(X)) share similar graph theoretic properties and have the same values for the parameters, e.g., diameter, eccentricity, girth, radius, chromatic number and clique number. By choosing the ring CP(X) where P is the ideal of all finite subsets of X such that XP is finite, we formulate an algorithm for coloring the vertices of G(CP(X)) and thereby get the chromatic number of AG(CP(X)). This exhibits an instance of coloring infinite graphs by just a finite number of colors. We show that any graph isomorphism : AG(CP(X)) → AG(CQ(Y)) maps G(CP(X)) isomorphically onto G(CQ(Y)) as a graph and a graph isomorphism φ : G(CP(X)) → G(CQ(Y)) can be extended to a graph isomorphism : AG(CP(X)) → AG(CQ(Y)) under a mild restriction on the function φ. Finally, we show that atleast for the rings CP(X) with finitely many P-points, so far as the graph properties are concerned, the induced subgraph G(CP(X)) is a good substitute for AG(CP(X).