Symmetric extensions of dihedral quandles and triple points of non-orientable surfaces

Quandle Coloring and Cocycle Invariants of Composite Knots and Abelian Extensions

Clark, W Edwin
Saito, Masahico
Vendramin, Leandro

April 2016

Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...

Algebraic Invariants of Knot Diagrams on Surfaces

Martinez, Ryan

January 2022

In this thesis we first give an introduction to knots, knot diagrams, and algebraic structures defin...

Quandle homology groups, their Betti numbers, and virtual knots

Scott Carter, J.
Jelsovsky, Daniel
Kamada, Seiichi
Saito, Masahico

March 2001

AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...

Symmetric extensions of dihedral quandles and triple points of non-orientable surfaces

Carter, J. Scott
Oshiro, Kanako
Saito, Masahico

April 2010

AbstractQuandles with involutions that satisfy certain conditions, called good involutions, can be u...

An estimate of the triple point numbers of surface-knots by quandle cocycle invariants

Hatakenaka, Eri

April 2004

AbstractThe triple point number of a surface-knot is defined to be the minimal number of triple poin...

Triple point cancelling numbers of surface links and quandle cocycle invariants

Iwakiri, Masahide

September 2006

AbstractThe unknotting or triple point cancelling number of a surface link F is the least number of ...

Polynomial quandle cocycles, their knot invariants and applications

Ameur, Kheira

June 2006

A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...

Dehn quandles of groups and orientable surfaces

Dhanwani, Neeraj K.
Raundal, Hitesh
Singh, Mahender

June 2021

Motivated by the construction of free quandles and Dehn quandles of orientable surfaces, we introduc...

Triple point cancelling numbers of surface links and quandle cocycle invariants

Iwakiri, Masahide

September 2006

The unknotting or triple point cancelling number of a surface link F is the least number of 1-handle...

Quandle Cohomology and State-sum Invariants of Knotted Curves and Surfaces

J. Scott Carter
Daniel Jelsovsky
Seiichi Kamada
Laurel Langford
Masahico Saito

January 1999

The 2-twist spun trefoil is an example of a sphere that is knotted in 4-dimensional space. Here this...

Extensions of Quandles and Cocycle Knot Invariants

Appiou Nikiforou, Marina

December 2002

Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...

Contributions to Quandle Theory: A Study of f-Quandles, Extensions, and Cohomology

Churchill, Indu Rasika U.

May 2017

Quandles are distributive algebraic structures that were introduced by David Joyce [24] in his P...

An estimate of the triple point numbers of surface-knots by quandle cocycle invariants, Topology Appl

Eri Hatakenaka

January 2004

Abstract. The triple point number of a surface-knot is defined to be the minimal number of triple po...

Computations of Quandle Cocycle Invariants of Knotted Curves and Surfaces

Carter, J.Scott
Jelsovsky, Daniel
Kamada, Seiichi
Saito, Masahico

January 2001

AbstractState-sum invariants for knotted curves and surfaces using quandle cohomology were introduce...

Three geometric applications of quandle homology

Niebrzydowski, M.

May 2009

AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...

Quandle Coloring and Cocycle Invariants of Composite Knots and Abelian Extensions

Clark, W Edwin
Saito, Masahico
Vendramin, Leandro

April 2016

Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...

Algebraic Invariants of Knot Diagrams on Surfaces

Martinez, Ryan

January 2022

In this thesis we first give an introduction to knots, knot diagrams, and algebraic structures defin...

Quandle homology groups, their Betti numbers, and virtual knots

Scott Carter, J.
Jelsovsky, Daniel
Kamada, Seiichi
Saito, Masahico

March 2001

AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...

Symmetric extensions of dihedral quandles and triple points of non-orientable surfaces

Carter, J. Scott
Oshiro, Kanako
Saito, Masahico

April 2010

AbstractQuandles with involutions that satisfy certain conditions, called good involutions, can be u...

An estimate of the triple point numbers of surface-knots by quandle cocycle invariants

Hatakenaka, Eri

April 2004

AbstractThe triple point number of a surface-knot is defined to be the minimal number of triple poin...

Triple point cancelling numbers of surface links and quandle cocycle invariants

Iwakiri, Masahide

September 2006

AbstractThe unknotting or triple point cancelling number of a surface link F is the least number of ...

Polynomial quandle cocycles, their knot invariants and applications

Ameur, Kheira

June 2006

A quandle is a set with a binary operation that satisfies three axioms that corresponds to the three...

Dehn quandles of groups and orientable surfaces

Dhanwani, Neeraj K.
Raundal, Hitesh
Singh, Mahender

June 2021

Motivated by the construction of free quandles and Dehn quandles of orientable surfaces, we introduc...

Triple point cancelling numbers of surface links and quandle cocycle invariants

Iwakiri, Masahide

September 2006

The unknotting or triple point cancelling number of a surface link F is the least number of 1-handle...

Quandle Cohomology and State-sum Invariants of Knotted Curves and Surfaces

J. Scott Carter
Daniel Jelsovsky
Seiichi Kamada
Laurel Langford
Masahico Saito

January 1999

The 2-twist spun trefoil is an example of a sphere that is knotted in 4-dimensional space. Here this...

Extensions of Quandles and Cocycle Knot Invariants

Appiou Nikiforou, Marina

December 2002

Knot theory has rapidly expanded in recent years. New representations of braid groups led to an extr...

Contributions to Quandle Theory: A Study of f-Quandles, Extensions, and Cohomology

Churchill, Indu Rasika U.

May 2017

Quandles are distributive algebraic structures that were introduced by David Joyce [24] in his P...

An estimate of the triple point numbers of surface-knots by quandle cocycle invariants, Topology Appl

Eri Hatakenaka

January 2004

Abstract. The triple point number of a surface-knot is defined to be the minimal number of triple po...

Computations of Quandle Cocycle Invariants of Knotted Curves and Surfaces

Carter, J.Scott
Jelsovsky, Daniel
Kamada, Seiichi
Saito, Masahico

January 2001

AbstractState-sum invariants for knotted curves and surfaces using quandle cohomology were introduce...

Three geometric applications of quandle homology

Niebrzydowski, M.

May 2009

AbstractIn this paper we describe three geometric applications of quandle homology. We show that it ...

Quandle Coloring and Cocycle Invariants of Composite Knots and Abelian Extensions

Clark, W Edwin
Saito, Masahico
Vendramin, Leandro

April 2016

Quandle colorings and cocycle invariants are studied for composite knots, and applied to chirality a...

Algebraic Invariants of Knot Diagrams on Surfaces

Martinez, Ryan

January 2022

In this thesis we first give an introduction to knots, knot diagrams, and algebraic structures defin...

Quandle homology groups, their Betti numbers, and virtual knots

Scott Carter, J.
Jelsovsky, Daniel
Kamada, Seiichi
Saito, Masahico

March 2001

AbstractLower bounds for the Betti numbers for homology groups of racks and quandles will be given u...

Symmetric extensions of dihedral quandles and triple points of non-orientable surfaces

Abstract

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Symmetric extensions of dihedral quandles and triple points of non-orientable surfaces

Abstract

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