Simplifying modular lattices by removing doubly irreducible elements

Jukka Kohonen

Simplifying modular lattices by removing doubly irreducible elements

Jukka Kohonen^*

^*Corresponding author for this work

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Abstract

Lattices are simplified by removing some of their doubly irreducible elements, resulting in smaller lattices called racks. All vertically indecomposable modular racks of n ≤ 40 elements are listed, and the numbers of all modular lattices of n ≤ 40 elements are obtained by Pólya counting. SageMath code is provided that allows easy access both to the listed racks, and to the modular lattices that were not listed. More than 3000-fold savings in storage space are demonstrated.

Original language	English
Pages (from-to)	49-64
Number of pages	16
Journal	Australasian Journal of Combinatorics
Volume	92
Issue number	1
Publication status	Published - 2025
MoE publication type	A1 Journal article-refereed

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Simplifying_modular_lattices_by_removing_doubly_irreducible_elementsFinal published version, 398 KBLicence: CC BY

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title = "Simplifying modular lattices by removing doubly irreducible elements",

abstract = "Lattices are simplified by removing some of their doubly irreducible elements, resulting in smaller lattices called racks. All vertically indecomposable modular racks of n ≤ 40 elements are listed, and the numbers of all modular lattices of n ≤ 40 elements are obtained by P{\'o}lya counting. SageMath code is provided that allows easy access both to the listed racks, and to the modular lattices that were not listed. More than 3000-fold savings in storage space are demonstrated.",

author = "Jukka Kohonen",

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N2 - Lattices are simplified by removing some of their doubly irreducible elements, resulting in smaller lattices called racks. All vertically indecomposable modular racks of n ≤ 40 elements are listed, and the numbers of all modular lattices of n ≤ 40 elements are obtained by Pólya counting. SageMath code is provided that allows easy access both to the listed racks, and to the modular lattices that were not listed. More than 3000-fold savings in storage space are demonstrated.

AB - Lattices are simplified by removing some of their doubly irreducible elements, resulting in smaller lattices called racks. All vertically indecomposable modular racks of n ≤ 40 elements are listed, and the numbers of all modular lattices of n ≤ 40 elements are obtained by Pólya counting. SageMath code is provided that allows easy access both to the listed racks, and to the modular lattices that were not listed. More than 3000-fold savings in storage space are demonstrated.

UR - https://www.scopus.com/pages/publications/105003678258

UR - https://ajc.maths.uq.edu.au/?page=get_volumes&volume=92

M3 - Article

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SP - 49

EP - 64

JO - Australasian Journal of Combinatorics

JF - Australasian Journal of Combinatorics

IS - 1

ER -

Simplifying modular lattices by removing doubly irreducible elements

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Simplifying modular lattices by removing doubly irreducible elements

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