Andrew Miller scite author profile

Andrew Miller

3Publications

37Citation Statements Received

22Citation Statements Given

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Amherst College, University of Queensland

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The Catenary and Tame Degrees on a Numerical Monoid Are Eventually Periodic

Chapman¹,

Corrales²,

Miller³

et al. 2014

J. Aust. Math. Soc.

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Let M be a commutative cancellative monoid. For m a nonunit in M, the catenary degree of m, denoted c(m), and the tame degree of m, denoted t(m), are combinatorial constants that describe the relationships between differing irreducible factorizations of m. These constants have been studied carefully in the literature for various kinds of monoids, including Krull monoids and numerical monoids. In this paper, we show for a given numerical monoid S that the sequences {c(s)} s∈S and {t(s)} s∈S are both eventually periodic. We show similar behavior for several functions related to the catenary degree which have recently appeared in the literature. These results nicely complement the known result that the sequence {∆(s)} s∈S of delta sets of S also satisfies a similar periodicity condition.2010 Mathematics subject classification: primary 20M13; secondary 20M14, 11D05.

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The catenary degrees of elements in numerical monoids generated by arithmetic sequences

Chapman

Corrales

Miller

et al. 2017

Communications in Algebra

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Some Remarks on Functions with One-Sided Derivatives

Miller

Výborný

1986

The American Mathematical Monthly

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Andrew Miller

The Catenary and Tame Degrees on a Numerical Monoid Are Eventually Periodic

The catenary degrees of elements in numerical monoids generated by arithmetic sequences

Some Remarks on Functions with One-Sided Derivatives

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