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Main Authors: Salix, Quinn J. M., Wood, Peyton Phinehas
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.26673
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author Salix, Quinn J. M.
Wood, Peyton Phinehas
author_facet Salix, Quinn J. M.
Wood, Peyton Phinehas
contents We prove that the displacement group of the dihedral quandle with n elements is isomorphic to the group generated by rotations of the n/2-gon when n is even and the n-gon when n is odd. We additionally show that any quandle with at least one trivial column has equivalent displacement and inner automorphism groups. Then, using a known enumeration of quandles which we confirm up to order 10, we verify the automorphism group and the inner automorphism group of all quandles (up to isomorphism) of orders less than or equal to 7, compute these for all 115,431 quandles orders 8, 9, and 10, and extend these results by computing the displacement group of all 115,837 quandles (up to isomorphism) of order less than or equal to 10.
format Preprint
id arxiv_https___arxiv_org_abs_2510_26673
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle More Automorphism Groups of Quandles
Salix, Quinn J. M.
Wood, Peyton Phinehas
Geometric Topology
Group Theory
57K12 (Primary) 20B25 (Secondary)
We prove that the displacement group of the dihedral quandle with n elements is isomorphic to the group generated by rotations of the n/2-gon when n is even and the n-gon when n is odd. We additionally show that any quandle with at least one trivial column has equivalent displacement and inner automorphism groups. Then, using a known enumeration of quandles which we confirm up to order 10, we verify the automorphism group and the inner automorphism group of all quandles (up to isomorphism) of orders less than or equal to 7, compute these for all 115,431 quandles orders 8, 9, and 10, and extend these results by computing the displacement group of all 115,837 quandles (up to isomorphism) of order less than or equal to 10.
title More Automorphism Groups of Quandles
topic Geometric Topology
Group Theory
57K12 (Primary) 20B25 (Secondary)
url https://arxiv.org/abs/2510.26673