Asymptotic behavior of invariants of syzygies of maximal Cohen-Macaulay modules
Abstract
Let (A,m) be a complete intersection ring of codimension c≥ 2 and dimension d≥ 1. Let M be a finitely generated maximal Cohen-Macaulay A-module. Set Mi=SyzAi(M). Let emi(M) be the i-th Hilbert coefficient of M with respect to m. We prove for all i0, the function i emj(Mi) is a quasi-polynomial type with period 2 and degree cx(M)-1 for j=0,1, where cx(M) is the complexity of M. For cx(M)=2, we prove n ∞em1(M2n+j)n≥ n ∞em0(M2n+j)n-n ∞μ(M2n+j)n for j=0,1. When equality holds, we prove that the Castelnuovo-Mumford regularity of the associated graded ring of Mi with respect to the maximal ideal m is bounded for all i≥ 0.
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