论文信息 - Intersection graphs of ideals of rings

Intersection graphs of ideals of rings

In this paper, we consider the intersection graph G(R) of nontrivial left ideals of a ring R. We characterize the rings R for which the graph G(R) is connected and obtain several necessary and sufficient conditions on a ring R such that G(R) is complete. For a commutative ring R with identity, we show that G(R) is complete if and only if G(R[x]) is also so. In particular, we determine the values of n for which G(Z"n) is connected, complete, bipartite, planar or has a cycle. Next, we characterize finite graphs which arise as the intersection graphs of Z"n and determine the set of all non-isomorphic graphs of Z"n for a given number of vertices. We also determine the values of n for which the graph of Z"n is Eulerian and Hamiltonian.

[1] Edward Szpilrajn-Marczewski. Sur deux propriétés des classes d'ensembles , 1945 .

[2] Shane P. Redmond,et al. An Ideal-Based Zero-Divisor Graph of a Commutative Ring , 2003 .

[3] Shamik Ghosh. Counting number of factorizations of a natural number , 2008, ArXiv.

[4] Rafael H. Villarreal,et al. On the Ideal Theory of Graphs , 1994 .

[5] D. West. Introduction to Graph Theory , 1995 .

[6] Béla Csákány,et al. О графе подгрупп конечной группы , 1969 .

[7] David F. Anderson,et al. The Zero-Divisor Graph of a Commutative Ring☆ , 1999 .

[8] B. Zelinka. Intersection graphs of finite abelian groups , 1975 .