English

Alternating Surgeries

Geometric Topology 2016-06-20 v1

Abstract

This thesis is concerned with the question of when the double branched cover of an alternating knot can arise by Dehn surgery on a knot in S3S^3. We approach this problem using a surgery obstruction, first developed by Greene, which combines Donaldson's Diagonalization Theorem with the dd-invariants of Ozsv{\'a}th and Szab{\'o}'s Heegaard Floer homology. This obstruction shows that if the double branched cover of an alternating knot or link LL arises by surgery on S3S^3, then for any alternating diagram the lattice associated to the Goeritz matrix takes the form of a changemaker lattice. By analyzing the structure of changemaker lattices, we show that the double branched cover of LL arises by non-integer surgery on S3S^3 if and only if LL has an alternating diagram which can be obtained by rational tangle replacement on an almost-alternating diagram of the unknot. When one considers half-integer surgery the resulting tangle replacement is simply a crossing change. This allows us to show that an alternating knot has unknotting number one if and only if it has an unknotting crossing in every alternating diagram. These techniques also produce several other interesting results: they have applications to characterizing slopes of torus knots; they produce a new proof for a theorem of Tsukamoto on the structure of almost-alternating diagrams of the unknot; and they provide several bounds on surgeries producing the double branched covers of alternating knots which are direct generalizations of results previously known for lens space surgeries. The thesis begins with an exposition of the changemaker surgery obstruction, giving an amalgamation of results due to Gibbons, Greene and the author. It then gives background material on alternating knots and changemaker lattices. The latter part of the thesis is then taken up with the applications of this theory.

Keywords

Cite

@article{arxiv.1606.05564,
  title  = {Alternating Surgeries},
  author = {Duncan McCoy},
  journal= {arXiv preprint arXiv:1606.05564},
  year   = {2016}
}

Comments

This is a PhD thesis submitted to the University of Glasgow. 136 pages with many figures

R2 v1 2026-06-22T14:28:01.951Z