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A Hilbert-Kunz function with a periodic term that has a given period

Published 20 Jun 2019 in math.AC | (1906.08821v1)

Abstract: A result of Monsky states that the Hilbert-Kunz function of a one-dimensional local ring of prime characteristic has a term $\phi$ that is eventually periodic. For example, in the case of a power series ring in one variable over a prime-characteristic field, $\phi$ is the zero function and is therefore immediately periodic with period 1. In additional examples produced by Kunz and Monsky, $\phi$ is immediately periodic with period 2. We show that, for every positive integer $\pi$, there exists a ring for which $\phi$ is immediately periodic with period $\pi$.

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