research
Papers and preprints
(w/ A. Wand) Stein-fillability and positivity in the mapping class group. 2024. arXiv
- We construct an infinite family of non-positive open books with once-punctured torus pages that support Stein-fillable contact structures. Combined with a result of Wendl, this allows us to give a complete answer to a long-standing question about the mapping class group of a compact surface with boundary: namely, we conclude that the monoid of monodromies supporting Stein-fillable contact structures is equal to the monoid of positive monodromies if and only if the surface is planar.
(w/ P. Feller) The twisting number of a ribbon knot is bounded below by its doubly slice genus. 2024. arXiv
- The twisting number of a ribbon knot K is the minimal number of tangle replacements on the symmetry axis of J#−J for any knot J that is required to produce a symmetric union diagram of K. We prove that the twisting number is bounded below by the doubly slice genus and produce examples of ribbon knots with arbitrarily high twisting number, addressing a problem of Tanaka. To this end, we establish a result of independent interest that the doubly slice genus of K is bounded above by the oriented band move distance between K and any weakly doubly slice link, which also enables us to determine hitherto unknown doubly slice genera of some knots with 12 crossings.
(w/ J. Simone) On chain link surgeries bounding rational homology balls and χ-slice 3-braid closures. 2024. arXiv
- We determine which integral surgeries on a large class of circular chain links bound rational homology balls. Our key tool is the lattice-theoretic cubiquity obstruction recently developed by Greene and Owens. We discuss a practical method of computing it, and, as an application, prove that a generalisation of the slice--ribbon conjecture holds for all but one infinite family of quasi-alternating 3-braid links. This extends previous results of Lisca concerning the conjecture for 3-braid knots.
(w/ A. Wand) Stein-fillable open books of genus one that do not admit positive factorisations. Math. Res. Lett. 30.3 (2023), pp. 709–719; arXiv
- We construct an infinite family of genus one open book decompositions supporting Stein-fillable contact structures and show that their monodromies do not admit positive factorisations. This extends a line of counterexamples in higher genera and establishes that a correspondence between Stein fillings and positive factorisations only exists for planar open book decompositions.
On slice alternating 3-braid closures. Pacific J. Math. 324.1 (2023), pp. 49–70; arXiv
- We construct ribbon surfaces of Euler characteristic one for several infinite families of alternating 3-braid closures. We also use a twisted Alexander polynomial obstruction to conclude the classification of smoothly slice knots which are closures of alternating 3-braids with up to 20 crossings.
Code
Code accompanying the 'On chain link surgeries bounding rational homology balls and χ-slice 3-braid closures' paper (w/ J. Simone):
SageMath scripts for computing twisted Alexander polynomials accompanying the 'On slice alternating 3-braid closures' paper:
Juvenilia
Some people have previously found these documents useful. They are likely to (and indeed do) contain mistakes, so use them at your own risk:
Notes from my undergraduate summer project on Frobenius algebras and 2D TQFTs
2017/18 SMSTC solutions: Geometry and Topology (Assignment 1, Solutions 1; Assignment 2, Solutions 2), Algebras and Representation Theory (Assignment 1, Solutions 1; Assignment 2, Solutions 2), Manifolds (Assignment 1, Solutions 1; Assignment 2, Solutions 2)
Part III essay 'Rational knots and the slice-ribbon conjecture'