Add to ORKGIf A is an abelian quandle and Q is a quandle, the hom set 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
Quandles are distributive algebraic structures that were introduced by David Joyce [24] in his P...
A homology and cohomology theory for topological quandles are introduced. The relation between these...
To better understand the fundamental quandle of a knot or link, it can be useful to look at finite q...
We investigate the relationship between the quandle and biquandle coloring invariant and obtain an e...
We continue the study of the quandle of homomorphisms into a medial quandle begun in [2]. We show th...
Biquandles are algebraic objects with two binary operations whose axioms encode the generalized Reid...
AbstractWe introduce the concept of the quandle partial derivatives, and use them to define extreme ...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...
A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...
We show that the isomorphism problems for left distributive algebras, racks, quandles and kei are as...
A nilpotent quandle is a quandle whose inner automorphism group is nilpotent. Such quandles have bee...
Sets with a self-distributive operation (in the sense of (a ⊳ b) ⊳ c = (a ⊳ c) ⊳ (b ⊳ c)), in partic...
There are many papers that introduce the relationship between knots and quandles which are written t...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
Quandles are distributive algebraic structures that were introduced by David Joyce [24] in his P...
A homology and cohomology theory for topological quandles are introduced. The relation between these...
To better understand the fundamental quandle of a knot or link, it can be useful to look at finite q...
We investigate the relationship between the quandle and biquandle coloring invariant and obtain an e...
We continue the study of the quandle of homomorphisms into a medial quandle begun in [2]. We show th...
Biquandles are algebraic objects with two binary operations whose axioms encode the generalized Reid...
AbstractWe introduce the concept of the quandle partial derivatives, and use them to define extreme ...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...
A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...
We show that the isomorphism problems for left distributive algebras, racks, quandles and kei are as...
A nilpotent quandle is a quandle whose inner automorphism group is nilpotent. Such quandles have bee...
Sets with a self-distributive operation (in the sense of (a ⊳ b) ⊳ c = (a ⊳ c) ⊳ (b ⊳ c)), in partic...
There are many papers that introduce the relationship between knots and quandles which are written t...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
Quandles are distributive algebraic structures that were introduced by David Joyce [24] in his P...
A homology and cohomology theory for topological quandles are introduced. The relation between these...
To better understand the fundamental quandle of a knot or link, it can be useful to look at finite q...