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报告题目:行列式中的斐波那契数和相关数
报 告 人:小松尚夫(Takao Komatsu),河南省科学院,教授
报告摘要: The study of determinants is fundamentally important; in particular, Fibonacci determinants are good examples of their utility in revealing elegant connections between linear algebra and number theory. In terms of Fibonacci matrices or determinants, there are many references to matrices or determinants that have the Fibonacci numbers as elements. Though there have not been many determinant expressions including or expressing the Fibonacci numbers, we give several results expressing Fibonacci numbers and their companions. They look simple but the structure of the deep interior will be resolved.
报告人简介:小松尚夫(Takao Komatsu),河南省科学院教授。毕业于澳大利亚Macquarie大学,师从著名数论学家A.J.Van der Poorten,历任日本三重大学、弘前大学教授;曾受聘武汉大学数学学院教授并入选湖北省“百人计划”。小松尚夫教授成果丰硕,在Mathematics of Computation、Mathematical Proceedings of the Cambridge Philosophical Society、Bulletin de la Société Mathématique de France、Japanese Journal of Mathematics、Journal of Number Theory、Acta Arithmetica等国际知名学术期刊发表论文200多篇,在连分数、丢番图逼近以及数论中的特殊函数方面做出了一系列成绩,是多个国际会议的组织者或学术委员会成员。
报告时间:2025年9月22日 14:00-15:00
报告地点:文渊楼B119
邀请人:代数与数论创新团队
主办单位:数学与统计学院
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