The Cohen-Macaulay Property of Affine Semigroup Rings in Dimension 2
Abstract
Let k be a field and x,y indeterminates over k. Let R=k[xa,xp1ys1,…,xptyst,yb] ⊂eq k[x,y]. We calculate the Hilbert polynomial of (xa,yb). The multiplicity of this ideal provides part of a criterion for the ring to be Cohen-Macaulay. Next, we prove a simple numerical criterion for R to be Cohen-Macaulay in the case when t=2. We also provide a simple algorithm which identifies the monomial k-basis of R/(xa,yb). Finally, these simple results are specialized to the case of projective monomial curves in P3.
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