Notes for AKT-090917-1/0:11:19: Difference between revisions

Let ${\displaystyle {\mathcal {K}}}$ denote the space of oriented knots in an oriented ${\displaystyle \mathbb {R} ^{3}}$ and ${\displaystyle A}$ be any abelian group. Then, given any invariant ${\displaystyle V:{\mathcal {K}}\rightarrow A}$, we can extend ${\displaystyle V}$ to ${\displaystyle 1}$-singular knots (i.e. knots with one double point) by setting:

Failed to parse (unknown function "\doublepoint"): {\displaystyle V^{(1)}(\doublepoint)=V(\overcrossing) - V(\undercrossing)}

This is analogous to taking the first derivative.