Sums of two cubes 

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Ari Shnidman, Hebrew University of Jerusalem
Fine Hall 214

Meeting ID:  920 2195 5230    Passcode:    The three-digit integer that is the cube of the sum of its digits. 

We prove that at least 2/21 of all integers can be written as a sum of two rational cubes, and at least 1/6 of all integers cannot. More generally, in any cubic twist family of elliptic curves, at least one 1/6 of curves have rank 0 and at least 1/6 of curves with good reduction at 2 have rank 1. I'll give an overview of the proof, which combines various methods (orbit-parameterizations over the integers, geometry-of-numbers, circle method, Iwasawa theory, etc), and I'll explain how the technique generalizes to certain families of higher genus curves/higher dimensional abelian varieties.   

This is joint work with Alpöge and Bhargava.