TY - JOUR
T1 - N-quandles of Spatial Graphs
AU - Peral, Veronica Backer
AU - Mellor, Blake
N1 - Publisher Copyright:
© Kyungpook Mathematical Journal
PY - 2024/6
Y1 - 2024/6
N2 - The fundamental quandle is a powerful invariant of knots, links and spatial graphs, but it is often difficult to determine whether two quandles are isomorphic. One approach is to look at quotients of the quandle, such as the n-quandle defined by Joyce [8]; in particular, Hoste and Shanahan [5] classified the knots and links with finite n-quandles. Mellor and Smith [12] introduced the N-quandle of a link as a generalization of Joyce’s n-quandle, and proposed a classification of the links with finite N-quandles. We generalize the Nquandle to spatial graphs, and investigate which spatial graphs have finite N-quandles. We prove basic results about N-quandles for spatial graphs, and conjecture a classification of spatial graphs with finite N-quandles, extending the conjecture for links in [12]. We verify the conjecture in several cases, and also present a possible counterexample.
AB - The fundamental quandle is a powerful invariant of knots, links and spatial graphs, but it is often difficult to determine whether two quandles are isomorphic. One approach is to look at quotients of the quandle, such as the n-quandle defined by Joyce [8]; in particular, Hoste and Shanahan [5] classified the knots and links with finite n-quandles. Mellor and Smith [12] introduced the N-quandle of a link as a generalization of Joyce’s n-quandle, and proposed a classification of the links with finite N-quandles. We generalize the Nquandle to spatial graphs, and investigate which spatial graphs have finite N-quandles. We prove basic results about N-quandles for spatial graphs, and conjecture a classification of spatial graphs with finite N-quandles, extending the conjecture for links in [12]. We verify the conjecture in several cases, and also present a possible counterexample.
KW - Quandle
KW - Spatial graph
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U2 - 10.5666/KMJ.2024.64.2.311
DO - 10.5666/KMJ.2024.64.2.311
M3 - Article
SN - 1225-6951
VL - 64
SP - 311
EP - 335
JO - Kyungpook Mathematical Journal
JF - Kyungpook Mathematical Journal
IS - 2
ER -