报告华体会(中国)官方:2023年11月28日(星期二)14:00-
报告地点:腾讯会议ID:359-424-722
报告人:夏先伟 教授
工作单位:苏州科技大学
举办单位:华体会网页入口
报告简介:
In their study of the truncated sums of the classical theta functions, Andrews-Merca and Guo-Zeng posed a conjecture on truncated sums of a special case of the Jacobi triple product identity which was confirmed independently by Mao and Yee. In 2016, Chan, Ho and Mao examined the truncated series arising from two consequences of the quintuple product identity. In this talk, we establish an explicit series form with nonnegative coefficients on a new truncated sum of a special cases of the Jacobi triple product identity by taking different truncated series which is stronger than the conjecture due to Andrews-Merca and Guo-Zeng. As a corollary of our results, we obtain a new truncated sums of Jacibi's identitywhich implies another conjecture given by Guo andZeng. In addition, we determine the signs of coefficientsof new truncated sums of two well-known identities derivedfrom the quintuple product identity which can be considered as the companion results of a theorem proved by Chan, Ho and Mao.
报告人简介:
夏先伟,苏州科技大学教授,博士生导师,江苏省杰青获得者。2010年博士毕业于南开大学组合数学中心,主要研究整数分拆、特殊函数。在Math. Comput., Proc. Edinb. Math. Soc., Adv. Appl. Math,JNT, Acta Arithm.等国际主流期刊上发表了多篇学术论文。主持多项国家自然科学基金项目。