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2021年数学学院"吉大学子全球胜任力提升计划”研究生系列短课程(8)

发表于: 2021-03-02   点击: 

报 告 人:Andrey Lazarev,Lancaster University

报告地点:腾讯会议

https://meeting.tencent.com/s/X079S8uLsWTA

会议 ID:401 7495 7545

校内联系人:生云鹤 shengyh@jlu.edu.cn


Model categories in algebra and topology: a minicourse

Abstract: this course will describe a modern approach to homotopy theory based on model categories, invented just over 50 years ago by the British mathematician Daniel Quillen. Model categories are an abstraction of the homotopy category of topological spaces but have applications extending far beyond algebraic topology, namely in algebraic geometry, homological algebra, representation theory, deformation theory and other fields. We will explain how model categories give a unified approach to classical homotopy theory and homological algebra.


授课日期

Date of Lecture

课程名称(讲座题目)

Name (Title) of Lecture

授课时间

Duration (Beijing Time)

参与人数

Number of Participants

March5, 2021

basic notions of category   theory

17:00-18:00

30

March8, 2021

basic notions   of homological algebra

17:00-18:00

30

March11, 2021

basic notions of homotopy   theory

17:00-18:00

30

March12, 2021

model   categories I

17:00-18:00

30

March16, 2021

model categories II

17:00-18:00

30

March17, 2021

derived   category of a ring

17:00-18:00

30

March18, 2021

homotopy   category of spaces

17:00-18:00

30

March19, 2021

future directions

17:00-18:00

30

Lecture 1: basic notions of category theory

Categories and functors, equivalence of categories. Adjoint and representable functors. Natural transformations, limits and colimits. Examples.

Lecture 2: basic notions of homological algebra

Chain complexes and their homology, chain homotopy, quasi-isomorphisms. Tensor products of complexes and complexes of homomorphisms. Projective and injective modules.

Lecture 3: basic notions of homotopy theory

Homotopy of continuous maps, homotopy equivalences of topological spaces. Cylinders and path spaces. Homotopy groups and weak homotopy equivalences.

Lecture 4: model categories I

Axioms of model categories, left and right homotopies. Fibrant and cofibrant objects.

Lecture 5: model categories II

The construction of the homotopy category of a model category. Derived functors. Localization of categories.

Lecture 6: derived category of a ring

Construction of the unbounded derived category of a ring. Small object argument. Projective and injective resolutions. Functors Tor and Ext.

Lecture 7: homotopy category of spaces

Construction of the model category of topological spaces and its homotopy category. CW complexes.

Lecture 8: future directions

Further examples of model categories, Quillen adjunctions and Quillen equivalences. Constructing new model categories from old. Infinity-categories.


报告人简介:

Andrey Lazarev,英国兰卡斯特大学教授,从事代数拓扑与同伦论的研究, Bull. Lond. Math. Soc.杂志主编,在Adv. Math.、 Proc. Lond. Math. Soc.J. Noncommut. Geom.等杂志上发表多篇高水平论文。