Welcome to Pure Mathematics

Patrick Naylor, McMaster University

Doubling Gluck twists

The Gluck twist of an embedded 2-sphere in the 4-sphere is a 4-manifold that is homeomorphic but not obviously diffeomorphic to the 4-sphere. Despite considerable study, these strange manifolds have remained a long-standing source of potential counterexamples to the only remaining case of the Poincaré conjecture. In this talk, I will give an overview of this conjecture, a visual introduction to 2-dimensional knot theory, and describe conditions that guarantee that (some) Gluck twists are standard, i.e., diffeomorphic to the 4-sphere. This is based on joint work with Dave Gabai and Hannah Schwartz.

MC 5501

Stanley Xiao, University of Northern British Columbia

Elliptic curves admitting a rational isogeny of prime degree, ordered by conductor

We consider explicit parametrizations of rational points on the modular curves X_0(p) for p in {2,3,5,7}, which corresponds to elliptic curves E/Q$ admitting a rational isogeny of degree p, and consider conductor polynomials of such curves. Conductor polynomials are polynomial divisors of the discriminant which more closely approximate the conductors of elliptic curves. By using results on almost-prime values of polynomials, including recent breakthrough work of Ben Green and Mehtaab Sawhney, we count such curves whose conductors have the least number of distinct prime factors, ordered by conductor. This is joint work with Alia Hamieh and Fatma Cicek. 

MC 5417

Elan Roth, University of Waterloo

A Continuation of Random Binary Sequences

We'll return to ML- and 1-Randomness and prove their equivalence. First, we will define some necessary machinery such as information content measures and the KC theorem.

MC 5403