The Amit–Ashurst conjecture for finite metacyclic p-groups

Rachel D. Camina; William L. Cocke; Anitha Thillaisundaram

doi:10.1007/s40879-023-00644-x

The Amit–Ashurst conjecture for finite metacyclic p-groups

Rachel D. Camina, William L. Cocke, Anitha Thillaisundaram

Mathematics (Faculty of Sciences)

Research output: Contribution to journal › Article › peer-review

Abstract

The Amit conjecture about word maps on finite nilpotent groups has been shown to hold for certain classes of groups. The generalised Amit conjecture says that the probability of an element occurring in the image of a word map on a finite nilpotent group G is either 0, or at least 1/|G|. Noting the work of Ashurst, we name the generalised Amit conjecture the Amit–Ashurst conjecture and show that the Amit–Ashurst conjecture holds for finite p-groups with a cyclic maximal subgroup.

Original language	English
Article number	46
Journal	European Journal of Mathematics
Volume	9
Issue number	3
DOIs	https://doi.org/10.1007/s40879-023-00644-x
Publication status	Published - 2023

Subject classification (UKÄ)

Mathematical Sciences

Free keywords

Amit–Ashurst conjecture
Fibres of word maps
Metacyclic p-groups
Words

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10.1007/s40879-023-00644-x

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abstract = "The Amit conjecture about word maps on finite nilpotent groups has been shown to hold for certain classes of groups. The generalised Amit conjecture says that the probability of an element occurring in the image of a word map on a finite nilpotent group G is either 0, or at least 1/|G|. Noting the work of Ashurst, we name the generalised Amit conjecture the Amit–Ashurst conjecture and show that the Amit–Ashurst conjecture holds for finite p-groups with a cyclic maximal subgroup.",

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AU - Cocke, William L.

AU - Thillaisundaram, Anitha

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Y1 - 2023

N2 - The Amit conjecture about word maps on finite nilpotent groups has been shown to hold for certain classes of groups. The generalised Amit conjecture says that the probability of an element occurring in the image of a word map on a finite nilpotent group G is either 0, or at least 1/|G|. Noting the work of Ashurst, we name the generalised Amit conjecture the Amit–Ashurst conjecture and show that the Amit–Ashurst conjecture holds for finite p-groups with a cyclic maximal subgroup.

AB - The Amit conjecture about word maps on finite nilpotent groups has been shown to hold for certain classes of groups. The generalised Amit conjecture says that the probability of an element occurring in the image of a word map on a finite nilpotent group G is either 0, or at least 1/|G|. Noting the work of Ashurst, we name the generalised Amit conjecture the Amit–Ashurst conjecture and show that the Amit–Ashurst conjecture holds for finite p-groups with a cyclic maximal subgroup.

KW - Amit–Ashurst conjecture

KW - Fibres of word maps

KW - Metacyclic p-groups

KW - Words

UR - https://www.scopus.com/pages/publications/85162023475

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JO - European Journal of Mathematics

JF - European Journal of Mathematics

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M1 - 46

ER -

The Amit–Ashurst conjecture for finite metacyclic p-groups

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