Add to ORKGABSTRACT. In this paper we formalize a combinatorial object for describing link diagrams called a Planar Diagram Code. PD-codes are used by the KnotTheory Mathematica package developed by Bar-Natan, et al. We present the set of PD-codes as a stand alone object and discuss its relationship with link diagrams. We give an explicit algorithm for reconstructing a knot diagram on a surface from a PD-code. We also discuss the intrinsic symmetries of PD-codes (i.e., invertibility and chirality). The moves analogous to the Reidemeister moves are also explored, and we show that the given set of PD-codes modulo these combinatorial Reidemeister moves is equivalent to classical link theory. 1
A prominent formula in knot and ribbon theory is White\u27s formula that looks at the relationship b...
In [5] M. Polyak and O. Viro developed a graphical calculus of diagrammatic formulas for Vassiliev l...
A knot is a circle piecewise-linearly embedded into the 3-sphere. The topology of a knot is intimate...
Abstract. We describe a method of encoding various types of link diagrams, including those with clas...
A theoretic and diagrammatic relationship between knots and planar graphs has enabled us to visualiz...
A “butterfly diagram” is a representation of a knot as a kind of graph on the sphere. This generaliz...
In this paper we introduce a representation of knots and links called a cube diagram. We show that a...
none2We introduce the concept of regular diagrams for knots and links in lens spaces, proving that t...
The “bridge index” of a knot is the least number of maximal overpasses taken over all diagrams of th...
We show that any two diagrams of the same knot or link are connected by a sequence of Reidemeister m...
A theoretic and diagrammatic relationship between knots and planar graphs has enabled us to visualiz...
This paper contains a survey of different methods for generating knots and links based on geometric ...
Abstract. Inspired by Lomonaco–Kauffman paper on quantum knots and knot mosaics we construct the mor...
grantor: University of TorontoThe two main approaches to knot theory, via local moves (Re...
AbstractUsing unknotting number, we introduce a link diagram invariant of type given in Hass and Now...
A prominent formula in knot and ribbon theory is White\u27s formula that looks at the relationship b...
In [5] M. Polyak and O. Viro developed a graphical calculus of diagrammatic formulas for Vassiliev l...
A knot is a circle piecewise-linearly embedded into the 3-sphere. The topology of a knot is intimate...
Abstract. We describe a method of encoding various types of link diagrams, including those with clas...
A theoretic and diagrammatic relationship between knots and planar graphs has enabled us to visualiz...
A “butterfly diagram” is a representation of a knot as a kind of graph on the sphere. This generaliz...
In this paper we introduce a representation of knots and links called a cube diagram. We show that a...
none2We introduce the concept of regular diagrams for knots and links in lens spaces, proving that t...
The “bridge index” of a knot is the least number of maximal overpasses taken over all diagrams of th...
We show that any two diagrams of the same knot or link are connected by a sequence of Reidemeister m...
A theoretic and diagrammatic relationship between knots and planar graphs has enabled us to visualiz...
This paper contains a survey of different methods for generating knots and links based on geometric ...
Abstract. Inspired by Lomonaco–Kauffman paper on quantum knots and knot mosaics we construct the mor...
grantor: University of TorontoThe two main approaches to knot theory, via local moves (Re...
AbstractUsing unknotting number, we introduce a link diagram invariant of type given in Hass and Now...
A prominent formula in knot and ribbon theory is White\u27s formula that looks at the relationship b...
In [5] M. Polyak and O. Viro developed a graphical calculus of diagrammatic formulas for Vassiliev l...
A knot is a circle piecewise-linearly embedded into the 3-sphere. The topology of a knot is intimate...