报告地点:翡翠科教楼B1702
报告人:Yiqiang Zhou 教授
工作单位:加拿大纽芬兰纪念大学
举办单位:英国威廉希尔公司
报告人简介:
周毅强教授在环论、模论和环上的线性代数理论做了许多出色的工作,是国际环论研究的领军人物之一。先后主持完成多项加拿大国家自然科学基金及博士点基金,出版专著《Classesof Modules》一部,在J. Algebra和J. Pure and Applied Algebra等国际著名学术杂志上发布150多篇学术论文。
报告一:New developments of the study of fine rings
报告时间:2024年6月4日(星期二)15:00-16:30
报告简介:
A ring (associative with identity) is called a fine ring if every nonzero element in it is the sum of a nilpotent element and a unit. G.Calugareanu and T.Y. Lam initiated the study of fine rings in "Fine rings: A new class of simple rings.", J. Algebra Appl. (2016). In this talk, we review known results and discuss new developments of this study.
报告二:Unit-fusible property via regularity-1
报告时间:2024年6月5日(星期三)15:00-16:30
报告简介:
An element in a ring (associative with identity) is called left unit-fusible if it is the sum of a left zero-divisor and a unit, and the ring is left unit-fusible if each of its nonzero elements is left unit-fusible. These notions rose in a paper by Ghashghaei and McGovern [E. Ghashghaei and W.Wm. McGovern, Fusible rings. Comm. Algebra 45(3)(2017), 1151-1165], where, among others, it is shown that unit-regular rings are unit-fusible and it is unknown whether or not every regular ring is unit-fusible. In this talk, we address the question of how (unit-) regularity and unit-fusible property are related to each other.
报告三:Unit-fusible property via regularity-2
报告时间:2024年6月6日(星期四)15:00-16:30
报告简介:
An element in a ring (associative with identity) is called left unit-fusible if it is the sum of a left zero-divisor and a unit, and the ring is left unit-fusible if each of its nonzero elements is left unit-fusible. These notions rose in a paper by Ghashghaei and McGovern [E. Ghashghaei and W.Wm. McGovern, Fusible rings. Comm. Algebra 45(3)(2017), 1151-1165], where, among others, it is shown that unit-regular rings are unit-fusible and it is unknown whether or not every regular ring is unit-fusible. In this talk, we address the question of how (unit-) regularity and unit-fusible property are related to each other.