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Hauptverfasser: Doolittle, Joseph, McDonough, Alex
Format: Preprint
Veröffentlicht: 2023
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Online-Zugang:https://arxiv.org/abs/2307.07900
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author Doolittle, Joseph
McDonough, Alex
author_facet Doolittle, Joseph
McDonough, Alex
contents It is broadly known that any parallelepiped tiles space by translating copies of itself along its edges. In earlier work relating to higher-dimensional sandpile groups, the second author discovered a novel construction which fragments the parallelpiped into a collection of smaller tiles. These tiles fill space with the same symmetry as the larger parallelepiped. Their volumes are equal to the components of the multi-row Laplace determinant expansion, so this construction only works when all these signs are non-negative (or non-positive). In this work, we extend the construction to work for all parallelepipeds, without requiring the non-negative condition. This naturally gives tiles with negative volume, which we understand to mean canceling out tiles with positive volume. In fact, with this cancellation, we prove that every point in space is contained in exactly one more tile with positive volume than tile with negative volume. This is a natural definition for a signed tiling. Our main technique is to show that the net number of signed tiles doesn't change as a point moves through space. This is a relatively indirect proof method, and the underlying structure of these tilings remains mysterious.
format Preprint
id arxiv_https___arxiv_org_abs_2307_07900
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Fragmenting any Parallelepiped into a Signed Tiling
Doolittle, Joseph
McDonough, Alex
Combinatorics
52C22, 05B45
It is broadly known that any parallelepiped tiles space by translating copies of itself along its edges. In earlier work relating to higher-dimensional sandpile groups, the second author discovered a novel construction which fragments the parallelpiped into a collection of smaller tiles. These tiles fill space with the same symmetry as the larger parallelepiped. Their volumes are equal to the components of the multi-row Laplace determinant expansion, so this construction only works when all these signs are non-negative (or non-positive). In this work, we extend the construction to work for all parallelepipeds, without requiring the non-negative condition. This naturally gives tiles with negative volume, which we understand to mean canceling out tiles with positive volume. In fact, with this cancellation, we prove that every point in space is contained in exactly one more tile with positive volume than tile with negative volume. This is a natural definition for a signed tiling. Our main technique is to show that the net number of signed tiles doesn't change as a point moves through space. This is a relatively indirect proof method, and the underlying structure of these tilings remains mysterious.
title Fragmenting any Parallelepiped into a Signed Tiling
topic Combinatorics
52C22, 05B45
url https://arxiv.org/abs/2307.07900