Boundes for Boxicity of some classes of graphs

Abstract

Let box(G) be the boxicity of a graph G, G[H1,H2,…, Hn] be the G-generalized join graph of n-pairwise disjoint graphs H1,H2,…, Hn, Gdk be a circular clique graph (where k≥ 2d) and (R) be the zero-divisor graph of a commutative ring R. In this paper, we prove that (Gdk)≥ box(Gdk), for all k and d with k≥ 2d. This generalizes the results proved in Aki. Also we obtain that box(G[H1,H2,…,Hn])≤ Σi=1nbox(Hi). As a consequence of this result, we obtain a bound for boxicity of zero-divisor graph of a finite commutative ring with unity. In particular, if R is a finite commutative non-zero reduced ring with unity, then ((R))≤ box((R))≤ 2((R))-2. where ((R)) is the chromatic number of (R). Moreover, we show that if N= Πi=1api2ni Πj=1bqj2mj+1 is a composite number, where pi's and qj's are distinct prime numbers, then box((ZN))≤ (Πi=1a(2ni+1)Πj=1b(2mj+2))-(Πi=1a(ni+1)Πj=1b(mj+1))-1, where ZN is the ring of integers modulo N. Further, we prove that, box((ZN))=1 if and only if either N=pn for some prime number p and some positive integer n≥ 2 or N=2p for some odd prime number p.