Milnor conjecture (topology)
In knot theory, the Milnor conjecture says that the slice genus of the torus knot is
It is in a similar vein to the Thom conjecture.
It was first proved by gauge theoretic methods by Peter Kronheimer and Tomasz Mrowka.[1] Jacob Rasmussen later gave a purely combinatorial proof using Khovanov homology, by means of the .[2]
References[]
- ^ Kronheimer, P. B.; Mrowka, T. S. (1993), "Gauge theory for embedded surfaces, I", Topology, 32 (4): 773–826, doi:10.1016/0040-9383(93)90051-V.
- ^ Rasmussen, Jacob A. (2004). "Khovanov homology and the slice genus". arXiv:math.GT/0402131..
Categories:
- Geometric topology
- Knot theory
- 4-manifolds
- Conjectures that have been proved
- Knot theory stubs