The Lind-Lehmer Constant for $\mathbb Z_2^r \times \mathbb Z_{4}^s

Michael J Mossinghoff; Vincent Pigno; Christopher Pinner

doi:10.2140/moscow.2019.8.151

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$The Lind-Lehmer Constant for $\mathbb Z_2^r \times \mathbb Z_{4}^s$

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The Lind-Lehmer Constant for $\mathbb Z_2^r \times \mathbb Z_{4}^s

Michael J Mossinghoff, Vincent Pigno and Christopher Pinner

05/14/2018

DOI: https://doi.org/10.2140/moscow.2019.8.151

Handle:

https://hdl.handle.net/20.500.12741/rep:5448

Abstract

Lind–Lehmer constant

Mahler measure

group determinant

Mathematics - Number Theory

For a finite abelian group the Lind–Lehmer constant is the minimum positive logarithmic Lind–Mahler measure for that group. Finding this is equivalent to determining the minimal nontrivial group determinant when the matrix entries are integers. ¶ For a group of the form [math] with [math] we show that this minimum is always [math] , a case of sharpness in the trivial bound. For [math] with [math] the minimum is [math] , and for [math] the minimum is [math] . Previously the minimum was only known for [math] - and [math] -groups of the form [math] or [math] . We also show that a congruence satisfied by the group determinant when [math] generalizes to other abelian [math] -groups.

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Title: The Lind-Lehmer Constant for $\mathbb Z_2^r \times \mathbb Z_{4}^s
Creators: Michael J Mossinghoff
Vincent Pigno
Christopher Pinner
Academic Unit: Mathematics/Statistics Department
Publisher: MSP
Publication Details: 05/14/2018
Identifiers: 99257847088201671; https://hdl.handle.net/20.500.12741/rep:5448; https://doi.org/10.2140/moscow.2019.8.151
Language: English