Graded Betti numbers of some circulant graphs

Abstract

Let G be the circulant graph Cn(S) with S ⊂eq \1, 2, …, n2 \, and let I(G) denote the edge ideal in the polynomial ring R=K[x0, x1, …, xn-1] over a field K. In this paper, we compute the N-graded Betti numbers of the edge ideals of three families of circulant graphs Cn(1,2,…,j,…, n2 ), Clm(1,2,…,2l,…, 3l,…, lm2 ) and Clm(1,2,…,l,…,2l,…, 3l,…, lm2 ). Other algebraic and combinatorial properties like regularity, projective dimension, induced matching number and when such graphs are well-covered, Cohen-Macaulay, Sequentially Cohen-Macaulay, Buchsbaum and S2 are also discussed.