Abstract

We prove various characterisations for the Cohen–Macaulay property for the invariant ring k[x1, …, xn]G, where k is a PID.We also show that, except for one case, all the invariant rings ℤ[x1, x2]G and ℤ[x1, x2, x3]G are Cohen–Macaulay. We also provide some sufficient conditions to obtain a polynomial invariant ring over the ring of integers.

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