Betti numbers of powers of path ideals of cycles

Abstract

Let Jn,m = (x1·s xm,x2 ·s xm+1,…,xnx1·s xm-1) be the m-path ideal of a cycle of length n 5 over a polynomial ring S = k[x1,…,xn]. Let t≥ 1 be an integer. We show that Jn,mt has a linear free resolution and give a precise formula for all of its Betti numbers when m = n-1, n-2.

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