Add to ORKGThe structure of classical minimal prime knot presentations suggests that there are often, perhaps always, subsegments that present either the trefoil or the figure-eight knot. A comprehensive study of the subknots of the minimal prime knot presentations through 15 crossings shows that this is always the case for these knot presentations. Among this set of 313, 258 prime knot presentation, there are only 547, or 0.17%, that do not contain a trefoil subknot. Thus, 99.83% of minimal prime knot presentations through 15 crossings contain trefoil subknots. We identify several infinite minimal alternating prime knot families that do not contain trefoil subknots but always contain figure-eight knots. We discuss the statistics of subknots of prime ...
We prove for rational knots a conjecture of Adams et al. that an alternating unknotting number one k...
Abstract. Plumbing surfaces of links were introduced to study the geometry of the complement of the ...
There were many attempts to settle the question whether there exist non trivial knots with trivial J...
Looking at the structure of minimal prime knot presentations, one can notice that there are often, p...
The tabulation of all prime knots up to a given number of crossings was one of the founding problems...
This paper proves that the fifteen 4-bridged examples in J. H. Conway's table of II-crossing kn...
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if th...
The tabulation of all prime knots up to a given number of crossings was one of the founding problems...
Abstract. This paper determines the minimal degree sequence for two com-pact rational knots, namely ...
example of a knot where the unknotting number was not realized in a minimal projection of the knot. ...
Previous work used polygonal realizations of knots to reduce the problem of computing the superbridg...
One of the Tait conjectures, which was stated 100 years ago and proved in the 1980’s, said that redu...
We enumerate and show tables of minimal diagrams for all prime knots up to the triple-crossing numbe...
Cohomology theory of links, introduced by the author, is combinatorial. Dror Bar-Natan rece...
For any given number of crossings c, there exists a formula to determine the number of 2-bridge knot...
We prove for rational knots a conjecture of Adams et al. that an alternating unknotting number one k...
Abstract. Plumbing surfaces of links were introduced to study the geometry of the complement of the ...
There were many attempts to settle the question whether there exist non trivial knots with trivial J...
Looking at the structure of minimal prime knot presentations, one can notice that there are often, p...
The tabulation of all prime knots up to a given number of crossings was one of the founding problems...
This paper proves that the fifteen 4-bridged examples in J. H. Conway's table of II-crossing kn...
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if th...
The tabulation of all prime knots up to a given number of crossings was one of the founding problems...
Abstract. This paper determines the minimal degree sequence for two com-pact rational knots, namely ...
example of a knot where the unknotting number was not realized in a minimal projection of the knot. ...
Previous work used polygonal realizations of knots to reduce the problem of computing the superbridg...
One of the Tait conjectures, which was stated 100 years ago and proved in the 1980’s, said that redu...
We enumerate and show tables of minimal diagrams for all prime knots up to the triple-crossing numbe...
Cohomology theory of links, introduced by the author, is combinatorial. Dror Bar-Natan rece...
For any given number of crossings c, there exists a formula to determine the number of 2-bridge knot...
We prove for rational knots a conjecture of Adams et al. that an alternating unknotting number one k...
Abstract. Plumbing surfaces of links were introduced to study the geometry of the complement of the ...
There were many attempts to settle the question whether there exist non trivial knots with trivial J...