Arc Presentations

An Arc Presentation ${\displaystyle A}$ of a knot ${\displaystyle K}$ (in "grid form", to be precise) is a planar (toroidal, to be precise) picture of the knot in which all arcs are either horizontal or vertical, in which the vertical arcs are alway "above" the horizontal arcs, and in which no two horizontal arcs have the same ${\displaystyle y}$-coordinate and no two vertical arcs have the same ${\displaystyle x}$-coordinate (read more at [1]). Without loss of generality, the ${\displaystyle x}$-coordinates of the vertical arcs in ${\displaystyle A}$ are the integers ${\displaystyle 1}$ through ${\displaystyle n}$ for some ${\displaystyle n}$, and the ${\displaystyle y}$-coordinates of the horizontal arcs in ${\displaystyle A}$ are (also!) the integers ${\displaystyle 1}$ through ${\displaystyle n}$.

((5,2), (1,3), (2,4), (3,5), (4,1))

Thus for example, on the left is an arc presentation ${\displaystyle A}$ of the trefoil knot. It can be represented numerically by the sequence of ordered pairs shown below it. This sequence reads: the lowest horizontal arc in ${\displaystyle A}$ connects the 5th vertical arc with the 2nd; the next horizontal arc in ${\displaystyle A}$ connects the 1st vertical with the 3rd, and so on. In general, an arc presentation involving ${\displaystyle n}$ horizontal and ${\displaystyle n}$ vertical arcs will be described in this way by a sequence of ${\displaystyle n}$ ordered pairs of integers in the range between ${\displaystyle 1}$ and ${\displaystyle n}$.

Arc presentations are used extensively in the computation of Heegaard Floer Knot Homologies.

KnotTheory` knows about arc presentations:

(For In[1] see Setup)

In[4]:=	Draw[ap]
Out[4]=	-Graphics-

In[8]:=	Draw[ap0]
Out[8]=	-Graphics-

In[11]:=	Reflect[ap] // Draw
Out[11]=	-Graphics-

In[14]:=	Draw[ap, OverlayMatrix -> MinesweeperMatrix[ap]]
Out[14]=	-Graphics-