报告题目:Covering theory for linear categories with application to derived category
报告人: 刘石平 教授(加拿大Sherbrooke大学)
报告时间: 7月13、15、17、20、22、24日,上午10:00―11:00
报告地点: 管理科研楼1318教室
摘要: We extend the Galois covering theory introduced by Bongartz�Gabriel for skeletal linear categories to general linear categories. We show that a Galois covering between Krull�Schmidt categories preserves irreducible morphisms and almost splits sequences. Specializing to derived categories, we study when a Galois covering between locally bounded linear categories induces a Galois covering between the bounded derived categories of finite dimensional modules. As an application, we show that each locally bounded linear category with radical squared zero admits a gradable Galois covering, which induces a Galois covering between the bounded derived categories of finite dimensional modules, and a Galois covering between the Auslander�Reiten quivers of these bounded derived categories. In a future paper, this will enable us to obtain a complete description of the bounded derived category of finite dimensional modules over a finite dimensional algebra with radical squared zero.
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