Topological sliceness of knots with trivial Alexander polynomial
星期五, 8 四月, 2022 - 10:30
Résumé :
We will give a proof, due to Garoufalidis and Teichner, of the following
result of Freedman : knots with trivial Alexander polynomial are
topologically slice, which means that they bound an embedded locally
flat two dimensional disk in the four-ball. The Alexander polynomial is
a well-understood and easy-to-compute invariant of knots, whose
definition will be recalled. The proof makes use of a more fundamental
result of Freedman, the disk embedding theorem. We will state this
theorem and derive the former as one of its corollaries by some
elementary topological considerations.
Institution de l'orateur :
IF
Thème de recherche :
Topologie
Salle :
4