The number of Reidemeister Moves Needed for Unknotting (1998)

by Joel Hass , Jeffrey C. Lagarias
Citations:35 - 11 self

Active Bibliography

55 The computational Complexity of Knot and Link Problems – Joel Hass, Jeffrey C. Lagarias - 1999
6 The computational complexity of knot genus and spanning area – Ian Agol, Joel Hass, William Thurston
6 The size of spanning disks for polygonal knots – Joel Hass, Jack Snoeyink, William P. Thurston - 1999
6 Algorithms for recognizing knots and 3-manifolds – Joel Hass - 1998
9 The size of spanning disks for polygonal curves – Joel Hass, Jack Snoeyink, William, P. Thurston
3 Towards an implementation of the B-H algorithm for recognizing the unknot – J. S. Birman, P. Boldi, M. Rampichini, S. Vigna - 2001
5 Invariants of Knot Diagrams – Joel Hass, Tahl Nowik - 2008
8 Decision problems in the space of Dehn fillings – William Jaco, Eric Sedgwick - 2003
44 0-Efficient Triangulations of 3-Manifolds – William Jaco, J. Hyam Rubinstein - 2002
10 A New Algorithm For Recognizing The Unknot – Joan S. Birman, Michael D. Hirsch - 2000
UNKNOTTING is in AM – Masao Hara, Seiichi Tani, Makoto Yamamoto
CHAPTER Topological Transformation Groups – Ro Adem, James F. Davis - 1997
2 Topics in Transformation Groups – Alejandro Adem, James F. Davis - 1999
FINDING PLANAR SURFACES IN KNOT- AND LINK-MANIFOLDS – William Jaco, J. Hyam Rubinstein, Eric Sedgwick - 2008
Links–Gould Two-Variable Laurent Polynomial Invariant of Oriented (1, 1) Tangles – Minimal Typical, Highest Weight, David De Wit
18 J.R.: On the Links-Gould invariant of links – David De Wit, Louis H Kauffman, Jon R Links
4 Unknot diagrams requiring a quadratic number of Reidemeister moves to untangle – Joel Hass, Tahl Nowik - 2007
NOTES ON THE ISOTOPY FINITENESS – Vincent Colin, Emmanuel Giroux, Ko Honda - 2003
3 Tracing Compressed Curves in Triangulated Surfaces ∗ – Jeff Erickson, Amir Nayyeri - 2012