李彦博编*的《Frobenius胞腔代数(英文版)》系统研究Frobenius胞腔代数表示与结构理论,主要包括对偶基的胞腔性、Schur元素与投射模、 Nakayama自同构及扭中心、Higman理想与中心、 Jucys-Murphy元素以及Jacboson根等相关理论。本书给供相关学者参考阅读。
1 Frobenius algebras
1.1 Definition of Frobenius algebras
1.2 Examples of Frobenius algebras
1.3 Nakayama automorphisms and Higman ideals
1.4 Schur elements of symmetric algebras
1.5 Canonical mesh algebras
2 Cellular algebras
2.1 Definition of cellular algebras
2.2 Representation theory of cellular algebras
2.3 Quasi-heredity of cellular algebras
2.4 A new class of diagram algebras
2.5 Standard based algebras
2.6 Affine cellular algebras and procellular algebras
3 Frobenius cellular algebras
3.1 Dual bases
3.2 Examples of non-symmetric Frobenius cellular algebras .
3.3 Symmetric cellular algebras
4 Centers and radicals of symmetric cellular algebras
4.1 Centers of symmetric cellular algebras
4.2 Nakayama twisted centers of Frobenius cellular algebras
4.3 Jucys-Murphy elements and centers
4.4 Centers of Ariki-Koike algebras
4.5 Radicals of symmetric cellular algebras
5 Hecke algebras of type A
5.1 Murphy basis
5.2 Dual Murphy basis
5.3 Examples
5.4 Kazhdan-Lusztig basis
Bibliography
Index
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