Add to ORKGThe Alexander Polynomial was the first knot polynomial invariant. These files provide tables of: Alexander polynomial coefficients Alexander polynomial evaluated at t=-1 for prime and composite knot types through 10 and 16 crossings. This dataset zipped file includes the knot tables and a readme documentation file. This material is based upon work supported by the National Science Foundation under Grant No. 1720342 to Eric J. Rawdon. Any opinions, findings, and conclusions or recommendations expressed in this material are those of the author(s) and do not necessarily reflect the views of the National Science Foundation
In the three main sections of this thesis (chapters II, III, and IV; chapter I consists of definitio...
Educação Superior::Ciências Exatas e da Terra::MatemáticaThis Demonstration computes the Alexander p...
Abstract. By the works of Kondo and Sakai, it is known that Alexander polynomi-als of knots which ar...
The Alexander Polynomial was the first knot polynomial invariant. These files provide tables of: A...
The Alexander Polynomial was the first knot polynomial invariant. These files provide tables of: A...
Abstract. The Alexander polynomial is the very rst polynomial knot invariant discovered. In this exp...
Graduation date: 2013The Alexander polynomial is a well understood classical knot invariant with int...
Title: Alexander polynomial Author: Ľubica Jančová Department: Department of Algebra Supervisor: doc...
This report will spend the majority of its time discussing two polynomial invariants. First we will ...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
AbstractKondo and Sakai independently gave a characterization of Alexander polynomials for knots whi...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
(Statement of Responsibility) by Jacob Price(Thesis) Thesis (B.A.) -- New College of Florida, 2018...
(Statement of Responsibility) by Jacob Price(Thesis) Thesis (B.A.) -- New College of Florida, 2018...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
In the three main sections of this thesis (chapters II, III, and IV; chapter I consists of definitio...
Educação Superior::Ciências Exatas e da Terra::MatemáticaThis Demonstration computes the Alexander p...
Abstract. By the works of Kondo and Sakai, it is known that Alexander polynomi-als of knots which ar...
The Alexander Polynomial was the first knot polynomial invariant. These files provide tables of: A...
The Alexander Polynomial was the first knot polynomial invariant. These files provide tables of: A...
Abstract. The Alexander polynomial is the very rst polynomial knot invariant discovered. In this exp...
Graduation date: 2013The Alexander polynomial is a well understood classical knot invariant with int...
Title: Alexander polynomial Author: Ľubica Jančová Department: Department of Algebra Supervisor: doc...
This report will spend the majority of its time discussing two polynomial invariants. First we will ...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
AbstractKondo and Sakai independently gave a characterization of Alexander polynomials for knots whi...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
(Statement of Responsibility) by Jacob Price(Thesis) Thesis (B.A.) -- New College of Florida, 2018...
(Statement of Responsibility) by Jacob Price(Thesis) Thesis (B.A.) -- New College of Florida, 2018...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
In the three main sections of this thesis (chapters II, III, and IV; chapter I consists of definitio...
Educação Superior::Ciências Exatas e da Terra::MatemáticaThis Demonstration computes the Alexander p...
Abstract. By the works of Kondo and Sakai, it is known that Alexander polynomi-als of knots which ar...