Abstract
Let R be a commutative ring with non zero unity. Let Ω(R) be a graph with vertices as elements of R whose two distinct vertices x and y are adjacent if and only if Rx + Ry = R. A graph (V, E) is said to be a split graph if V is the disjoint union of two sets K and S where K induces a complete subgraph and S is an independent set. We investigate the properties of R when Ω(R) is split.
Notes
Communicated by Q. Wu.