Add to ORKGE. Bunch, P. Lofgren, A. Rapp and D. N. Yetter [J. Knot theory Ramifications (2010)] pointed out that by considering inner automorphism groups of quandles, one have a functor from the category of quandles with surjective homomorphisms to that of groups with surjective homomorphisms. In this paper, we focus on faithful quandles. As main results, we give category equivalence between the category of faithful quandles with surjective quandle homomorphisms and that of pairs of groups and their generators with suitable group homomorphisms. We are also interested in injective quandle homomorphisms. By defining suitable morphisms among pairs of groups and their generators, we obtain a category which is equivalent to the category of faithful quandle...
We give a foundational account on topological racks and quandles. Specifically, we define the notion...
AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...
For any twisted conjugate quandle $Q$, and in particular any Alexander quandle, there exists a group...
Quandles are mathematical structures that have been mostly studied in knot theory, where they determ...
AbstractWe introduce the concept of the quandle partial derivatives, and use them to define extreme ...
We study and compare two factorization systems for surjective homomorphisms in the category of quand...
This thesis arose from a desire to better understand the structures of automorphism groups and inner...
Quandles are self-distributive, right-invertible, idempotent algebras. A group with conjugation for ...
A homology and cohomology theory for topological quandles are introduced. The relation between these...
If A is an abelian quandle and Q is a quandle, the hom set Hom(Q,A) of quandle homomorphisms from Q ...
Motivated by the construction of free quandles and Dehn quandles of orientable surfaces, we introduc...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
A nilpotent quandle is a quandle whose inner automorphism group is nilpotent. Such quandles have bee...
We present methods of constructing examples of quandles of order 3n, where n is greater or equal to ...
Quandles are distributive algebraic structures originally introduced independently by David ...
We give a foundational account on topological racks and quandles. Specifically, we define the notion...
AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...
For any twisted conjugate quandle $Q$, and in particular any Alexander quandle, there exists a group...
Quandles are mathematical structures that have been mostly studied in knot theory, where they determ...
AbstractWe introduce the concept of the quandle partial derivatives, and use them to define extreme ...
We study and compare two factorization systems for surjective homomorphisms in the category of quand...
This thesis arose from a desire to better understand the structures of automorphism groups and inner...
Quandles are self-distributive, right-invertible, idempotent algebras. A group with conjugation for ...
A homology and cohomology theory for topological quandles are introduced. The relation between these...
If A is an abelian quandle and Q is a quandle, the hom set Hom(Q,A) of quandle homomorphisms from Q ...
Motivated by the construction of free quandles and Dehn quandles of orientable surfaces, we introduc...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
A nilpotent quandle is a quandle whose inner automorphism group is nilpotent. Such quandles have bee...
We present methods of constructing examples of quandles of order 3n, where n is greater or equal to ...
Quandles are distributive algebraic structures originally introduced independently by David ...
We give a foundational account on topological racks and quandles. Specifically, we define the notion...
AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...
For any twisted conjugate quandle $Q$, and in particular any Alexander quandle, there exists a group...