2021
DOI: 10.48550/arxiv.2104.04408
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Decimation limits of principal algebraic $\mathbb{Z}^d$-actions

Abstract: Let f be a Laurent polynomial in d commuting variables with integer coefficients. Associated to f is the principal algebraic Z d -action α f on a compact subgroup X f of T Z d determined by f . Let N 1 and restrict points in X f to coordinates in N Z d . The resulting algebraic N Z d -action is again principal, and is associated to a polynomial gN whose support grows with N and whose coefficients grow exponentially with N . We prove that by suitably renormalizing these decimations we can identify a limiting be… Show more

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