CORRECTION TO ‘NEW TOPOLOGICALLY SLICE KNOTS’ STEFAN FRIEDL AND PETER TEICHNER Abstract. In [FT05, Figure 1.5] an incorrect example for [FT05, Theorem 1.3] was given. In this note we present a correct example. We fi

Source URL: people.mpim-bonn.mpg.de

• Knot theory
• Knot invariants
• Alexander polynomial
• Polynomials
• Knot
• Slice knot
• Crossing number
• Satellite knot
• Unknot
• Torus knot

Radical Rings, Quantum Groups, and “Theory of the Unknot” Wolfgang Rump In this talk, I will throw a bridge from radical rings to a variety of quantum-like mathematical structures

Source URL: www.iaz.uni-stuttgart.de

Tackling Fluid Structures Complexity by the Jones Polynomial

Source URL: www.matapp.unimib.it

• Algebra
• Jones polynomial
• Skein relation
• Trefoil knot
• Knot polynomial
• Unknot
• Bracket polynomial
• Knot invariant
• Whitehead link
• Knot theory
• Topology
• Abstract algebra

Errata to “Topological Algorithms for Graphs on Surfaces” Éric Colin de Verdière August 17, 2012

Source URL: www.di.ens.fr

• Mathematical analysis
• Geometric topology
• Analytic number theory
• Conjectures
• Unknotting problem
• Unknot
• Ambient isotopy
• Riemann hypothesis
• Homeomorphism
• Topology
• Mathematics
• Knot theory

Khovanov homology is an unknot-detector P. B. Kronheimer and T. S. Mrowka Harvard University, Cambridge MA[removed]Massachusetts Institute of Technology, Cambridge MA[removed]Abstract. We prove that a knot is the unknot if

Source URL: www.math.harvard.edu

• Differential topology
• Homology theory
• Floer homology
• Khovanov homology
• Stiefel–Whitney class
• Line bundle
• Vector bundle
• Spectral sequence
• Cobordism
• Topology
• Abstract algebra
• Algebraic topology

Khovanov homology is an unknot-detector P. B. Kronheimer and T. S. Mrowka Harvard University, Cambridge MA[removed]Massachusetts Institute of Technology, Cambridge MA[removed]Abstract. We prove that a knot is the unknot if

Source URL: www.math.harvard.edu

• Differential topology
• Homology theory
• Floer homology
• Khovanov homology
• Stiefel–Whitney class
• Line bundle
• Vector bundle
• Spectral sequence
• Cobordism
• Topology
• Abstract algebra
• Algebraic topology

Cell, Vol. 19, [removed], March 1980, Copyright © 1980 by MIT Type II DNA Topoisomerases: Enzymes That Can Unknot a Topologically Knotted DNA Molecule via a Reversible Double-Strand Break Leroy F. Liu, Chung-Cheng Liu an

Source URL: brucealberts.ucsf.edu

• Helices
• Microbiology
• Type II topoisomerase
• Nucleic acid double helix
• DNA supercoil
• Topoisomerase
• DNA replication
• DNA gyrase
• Restriction enzyme
• Biology
• DNA
• Molecular biology

BULLETIN(New Series) OF THE AMERICANMATHEMATICALSOCIETY Volume 28, Number 2, April 1993 NEW POINTS OF VIEW IN KNOT THEORY JOAN S. BIRMAN

Source URL: www.ams.org

• Abstract algebra
• Knot invariant
• Unknot
• Finite type invariant
• Alexander polynomial
• Jones polynomial
• Knot polynomial
• Trefoil knot
• HOMFLY polynomial
• Knot theory
• Topology
• Geometric topology

Algebraic & Geometric Topology[removed]–1274 msp Characterizing slopes for torus knots YI NI

Source URL: www.its.caltech.edu

• Abstract algebra
• Floer homology
• Torus knot
• Seifert surface
• Unknot
• Dehn surgery
• Trefoil knot
• Alexander polynomial
• Fibered knot
• Topology
• Knot theory
• Geometric topology

Unknots With Highly Knotted Control Polygons J. Bisceglioa , T. J. Petersb,c,1,∗, J. A. Roulierb , C. H. S´equind a BlueSky b Department c Kerner

Source URL: www.cs.berkeley.edu

• Knot theory
• Polygons
• Geometric topology
• Unknot
• Non-uniform rational B-spline
• Surface
• Knot
• Vertex
• Curve
• Geometry
• Topology
• 3D computer graphics