Add to ORKGColor poster with text, images and figures.The goal of this poster is to discuss a relationship between quandle theoretic invariants of links, linking number and a higher order analogue of linking number, called the triple linking number. More precisely, we present quandles such that the number of colorings of a link by these quandles recover its linking number and triple linking number.National Science Foundation; Blugold Fellowship; Mathematical Association of America; University of Wisconsin--Eau Claire Office of Research and Sponsored Program
AbstractThe unknotting or triple point cancelling number of a surface link F is the least number of ...
Quandle of a link diagram is very useful tool to describe the knot group via Wirtinger presentation....
AbstractBourgoin defined the notion of a twisted link which corresponds to a stable equivalence clas...
Color poster with text, images, and formulas.In the 1950’s Milnor defined a new family of tools of l...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
We present a set of 26 finite quandles that distinguish (up to reversal and mirror image) by number ...
Quandles, which are algebraic structures related to knots, can be used to color knot diagrams, and t...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
In this paper, we introduce an enhancement of the quandle coloring quiver, which is an invariant of ...
Title: Algebraic Structures for Knot Coloring Author: Martina Vaváčková Department: Department of Al...
We show that quandle rings and their idempotents lead to proper enhancements of the well-known quand...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
The thesis deal with coloring knots by algebraical structures called quandles. We will introduce the...
The unknotting or triple point cancelling number of a surface link F is the least number of 1-handle...
We study the difference between quandles that arise from conjugation in groups and those which do no...
AbstractThe unknotting or triple point cancelling number of a surface link F is the least number of ...
Quandle of a link diagram is very useful tool to describe the knot group via Wirtinger presentation....
AbstractBourgoin defined the notion of a twisted link which corresponds to a stable equivalence clas...
Color poster with text, images, and formulas.In the 1950’s Milnor defined a new family of tools of l...
Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...
We present a set of 26 finite quandles that distinguish (up to reversal and mirror image) by number ...
Quandles, which are algebraic structures related to knots, can be used to color knot diagrams, and t...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
In this paper, we introduce an enhancement of the quandle coloring quiver, which is an invariant of ...
Title: Algebraic Structures for Knot Coloring Author: Martina Vaváčková Department: Department of Al...
We show that quandle rings and their idempotents lead to proper enhancements of the well-known quand...
Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...
The thesis deal with coloring knots by algebraical structures called quandles. We will introduce the...
The unknotting or triple point cancelling number of a surface link F is the least number of 1-handle...
We study the difference between quandles that arise from conjugation in groups and those which do no...
AbstractThe unknotting or triple point cancelling number of a surface link F is the least number of ...
Quandle of a link diagram is very useful tool to describe the knot group via Wirtinger presentation....
AbstractBourgoin defined the notion of a twisted link which corresponds to a stable equivalence clas...