Diophantine tuples and bipartite Diophantine tuples
Kyle Yip (UBC)
Abstract: A set of positive integers is called a Diophantine tuple if the product of any two distinct elements in the set is one less than a square. There is a long history and extensive literature on the study of Diophantine tuples and their generalizations in various settings. In this talk, we focus on the following generalization: for integers $n \neq 0$ and $k \ge 3$, we call a set of positive integers a Diophantine tuple with property $D_{k}(n)$ if the product of any two distinct elements is $n$ less than a $k$-th power, and we denote $M_k(n)$ be the largest size of a Diophantine tuple with property $D_{k}(n)$. I will present an improved upper bound on $M_k(n)$ and discuss its bipartite analogue (where we have a pair of sets instead of a single set). Joint work with Seoyoung Kim and Semin Yoo.
algebraic geometrynumber theory
Audience: researchers in the discipline
( paper )
Series comments: The Number Theory and Algebraic Geometry (NT-AG) seminar is a research seminar dedicated to topics related to number theory and algebraic geometry hosted by the NT-AG group (Nils Bruin, Imin Chen, Stephen Choi, Katrina Honigs, Nathan Ilten, Marni Mishna).
We acknowledge the support of PIMS, NSERC, and SFU.
For Fall 2025, the organizers are Katrina Honigs and Peter McDonald.
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