Complete r-partite zero-divisor graphs and coloring of commutative semigroups

Abstract

For a commutative semigroup S with 0, the zero-divisor graph of S denoted by (S) is the graph whose vertices are nonzero zero-divisor of S, and two vertices x, y are adjacent in case xy=0 in S. In this paper we study the case where the graph (S) is complete r-partite for a positive integer r. Also we study the commutative semigroups which are finitely colorable.

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