Add to ORKGQuandles, which are algebraic structures related to knots, can be used to color knot diagrams, and the number of these colorings is called the quandle coloring invariant. We strengthen the quandle coloring invariant by considering a graph structure on the space of quandle colorings of a knot, and we call our graph the quandle coloring quiver. This structure is a categorification of the quandle coloring invariant. Then, we strengthen the quiver by decorating it with Boltzmann weights. Explicit examples of links that show that our enhancements are proper are provided, as well as background information in quandle theory
We present a set of 26 finite quandles that distinguish (up to reversal and mirror image) by number ...
We show that the isomorphism problems for left distributive algebras, racks, quandles and kei are as...
AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...
Quandles, which are algebraic structures related to knots, can be used to color knot diagrams, and t...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
In this paper, we introduce an enhancement of the quandle coloring quiver, which is an invariant of ...
There are many papers that introduce the relationship between knots and quandles which are written t...
The thesis deal with coloring knots by algebraical structures called quandles. We will introduce the...
A quandle coloring quiver is a quiver structure, introduced by Karina Cho and Sam Nelson, which is d...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
Title: Algebraic Structures for Knot Coloring Author: Martina Vaváčková Department: Department of Al...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
In this thesis we first give an introduction to knots, knot diagrams, and algebraic structures defin...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...
We present a set of 26 finite quandles that distinguish (up to reversal and mirror image) by number ...
We show that the isomorphism problems for left distributive algebras, racks, quandles and kei are as...
AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...
Quandles, which are algebraic structures related to knots, can be used to color knot diagrams, and t...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
In this paper, we introduce an enhancement of the quandle coloring quiver, which is an invariant of ...
There are many papers that introduce the relationship between knots and quandles which are written t...
The thesis deal with coloring knots by algebraical structures called quandles. We will introduce the...
A quandle coloring quiver is a quiver structure, introduced by Karina Cho and Sam Nelson, which is d...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
Title: Algebraic Structures for Knot Coloring Author: Martina Vaváčková Department: Department of Al...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
In this thesis we first give an introduction to knots, knot diagrams, and algebraic structures defin...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...
We present a set of 26 finite quandles that distinguish (up to reversal and mirror image) by number ...
We show that the isomorphism problems for left distributive algebras, racks, quandles and kei are as...
AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...