报告名称:
Diophantine tuples over integers and finite fields
报告专家:
叶智恺
专家所在单位:加拿大英属哥伦比亚(
UBC
)
报告时间:2024-03-28 上午 10 点-12 点
报告地点:线上,
腾讯会议:994 910 722
专家简介:
叶智恺,英属哥伦比亚大学博士。主要研究方向包括算术组合
,
极值组合,和解析数论。已
在
Acta Arith., Finite Fields Appl., J. Combin. Theory Ser. A, Mathematika
等杂志发表学术
论文
16
篇。
报告摘要:
Yoo. Semin and Kim Seoyoung with work Joint problem. same the of model field finite
the study to is ingredient key A $M_k(n)$. on bound upper improved an present will I
talk, this In $D_{k}(n)$. property with tuple Diophantine a of size largest the be
$M_k(n)$ denote we and power, $k$-th a than less $n$ is elements distinct two any of
product the if $D_{k}(n)$ property with tuple Diophantine a integers positive of set a call
we 2$, \ge $k and 1$ \ge $n each for generalization: following the on focus we talk, this
In settings. various in generalizations their and tuples Diophantine of study the on literature
extensive and history long a is There square. a than less one is set the in elements distinct
two any of product the if $m$-tuple Diophantine a is integers positive distinct of
a_{m}\}$ a_{2},\ldots, $\{a_{1}, set A
