Autor:	Crans, Alissa S., Nelson, Sam
Rok vydání:	2013
Předmět:	Mathematics - Geometric Topology Mathematics - Quantum Algebra 57M27 57M25
Druh dokumentu:	Working Paper
Popis:	If $A$ is an abelian quandle and $Q$ is a quandle, the hom set $\mathrm{Hom}(Q,A)$ of quandle homomorphisms from $Q$ to $A$ has a natural quandle structure. We exploit this fact to enhance the quandle counting invariant, providing an example of links with the same counting invariant values but distinguished by the hom quandle structure. We generalize the result to the case of biquandles, collect observations and results about abelian quandles and the hom quandle, and show that the category of abelian quandles is symmetric monoidal closed. Comment: 15 pages; revision 1 removes an incorrect remark; revision 2 corrects some small typos. To appear in J. Knot Theory Ramifications
Databáze:	arXiv
Externí odkaz:	http://arxiv.org/abs/1310.0852 Zobrazit plný text záznamu View this record from Arxiv