形变理论综述(二):同伦方法(英文)
发布时间:2023-05-21 21:56
本文从Hinich,Manetti和Pridham在同伦代数上的结果出发,给出形变理论的一个通用方法.特别地,我们证明所有特征为0的形变函子被一个同伦意义下特定的分次李代数控制,同时对任意特征的形变函子给出了非交换的类似结果.
【文章页数】:21 页
【文章目录】:
0 Introduction
1 Closed Model Categories
2 Brown Representability Theorem for Compactly Gener-ated Model Categories
3 MC Elements and MC Moduli Sets
3.1 MC Moduli in dg Lie Algebras
3.2 MC Moduli in dg Algebras
4 Koszul Duality
4.1 dg Coalgebras and Pseudocompact dg Algebras
4.2 Quillen Equivalence between DGLA and
4.3 Quillen Equivalence between DGA/k and
4.4 Relationship between Two Types of Koszul Duality
5 Main Theorems
5.1 MC Elements and the Deformation Functor based on a dg Lie Algebra
5.2 Finding a dg Lie Algebra associated with a Deformation Functor
5.3 Associative Deformation Theory
5.4 Finding a dg Algebra Associated with a Deformation Functor
5.5 Comparing Commutative and Associative Deformations
本文编号:3821497
【文章页数】:21 页
【文章目录】:
0 Introduction
1 Closed Model Categories
2 Brown Representability Theorem for Compactly Gener-ated Model Categories
3 MC Elements and MC Moduli Sets
3.1 MC Moduli in dg Lie Algebras
3.2 MC Moduli in dg Algebras
4 Koszul Duality
4.1 dg Coalgebras and Pseudocompact dg Algebras
4.2 Quillen Equivalence between DGLA and
4.3 Quillen Equivalence between DGA/k and
4.4 Relationship between Two Types of Koszul Duality
5 Main Theorems
5.1 MC Elements and the Deformation Functor based on a dg Lie Algebra
5.2 Finding a dg Lie Algebra associated with a Deformation Functor
5.3 Associative Deformation Theory
5.4 Finding a dg Algebra Associated with a Deformation Functor
5.5 Comparing Commutative and Associative Deformations
本文编号:3821497
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