2025. 07. 08. 11:15 - 2025. 07. 08. 12:30
Kutyás Room
Előadó neve:
Somnath Jha
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Esemény típusa:
szeminárium
Szervezés:
Intézeti
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Seminar on automorphic forms
Leírás
An integer $n$ is said to be a rational cube sum or simply a cube sum if n can be written as a sum of cubes of two rational numbers. For example, $6 = (17/21)^3 +(37/21)^3$.
A cube-free integer $n > 2$ is a cube sum if and only if the ‘elliptic curve’ $y^2 = x^3 − 432n^2$ has infinitely many solutions over the rational numbers. A recent result by Alpoge, Bhargava, Shnidman, Burungale, and Skinner shows that a positive proportion of positive integers are cube sums, while a positive proportion of integers are not. We will discuss the cube sum problem for a special family of integers.
This talk is based on joint work with Das, Majumdar, Shingavekar, and Sury.