Open AccessSome Properties of the Intersection Graph for Finite Commutative Principal Ideal Rings
Author(s) -
Emad Abu Osba,
Salah Al-Addasi,
Omar A. AbuGhneim
Publication year - 2014
Publication title -
international journal of combinatorics
Language(s) - English
Resource type - Journals
eISSN - 1687-9171
pISSN - 1687-9163
DOI - 10.1155/2014/952371
Subject(s) - mathematics , combinatorics , independence number , principal ideal , graph , discrete mathematics , commutative ring , finite graph , commutative property , prime (order theory)
Let R be a commutative finite principal ideal ring with unity, and let G(R) be the simple graph consisting of nontrivial proper ideals of R as vertices such that two vertices I and J are adjacent if they have nonzero intersection. In this paper we continue the work done by Abu Osba. We calculate the radius, eccentricity, domination number, independence number, geodetic number, and the hull number for this graph. We also determine when G(R) is chordal. Finally, we study some properties of the complement graph of G(R).
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