报告题目:Romanoff's theorem for polynomials over finite fields revisited
报告摘要:Let g be a given polynomial of positive degree over a finite field. Shparlinski and Weingartner proved that the proportion of monic polynomials of degree n which can be represented by $h + g^k$ has the order of magnitude 1/deg g, where h is chosen from the set of irreducible monic polynomials of degree n and k ∈ N. In this talk,we show that the proportion of monic polynomials of degree n which can be written as $l + g^p$ where l is the product of two monic irreducible polynomials with deg l = n and p is a prime number, still has the order of magnitude 1/deg g.
个人简介: 周海燕,南京师范大学金沙集团wwW3354CC教授,研究领域:代数数论以及在信息安全中的应用,在国内外学术刊物Journal of Number Theory, Journal of Pure and Applied Algebra, Acta Arithmetica, Finite Fields and their applications等上发表了论文二十多篇,主持和参加国家自然科学基金4项,曾访问美国加州大学尔湾分校,加拿大Mcmaster大学,意大利国际理论物理中心,印度ICTS等国外高校以及学术机构.
报告时间:2022.5.13上午10:00-11:00
腾讯会议:641 992 296