Let  $H$be a finite dimensional Hopf  $C^*$- algebra,  $H_1$be a Hopf *-subalgebra of  $H$. One considers the structure of the observable algebra  and the symmetry of field algebra  in Hopf spin models determined by  . The commutation relations between links  and sites  give rise to the observable algebra  .  Further, using the iterated tensor product of finite *-algebras, one can prove that the observable algebra is * -isomorphic to  , where  denotes the dual of     , and     includes a  -inductive limit procedure. The field algebra  follows from the coaction of the quantum double  on the observable algebra  , defined as the crossed product  . Here  is the bicrossed product of the opposite dual  of  and  with respect to the coadjoint representation latter acting on the former and vice versa. This product yields a  - invariant subalgebra of  which is exactly the observable algbra     . Moreover, a duality between  and  implemented by a *-representation of  is obtained. In other words, there exists a unique *-homomorphism of  fulfilling the action of  on     such that  ) and  commutant with each other.

报告人简介：

蒋立宁，北京理工大学数学与统计学院教授，博士生导师。1993年于江苏师范大学获学士学位，1996年于曲阜师范大学获硕士学位，1999年于北京大学澳门永利官网总站入口老网址获博士学位。2001年清华大学高等研究中心博士后出站后，进入北京理工大学工作，2007年晋升为教授。研究领域是泛函分析，主要研究兴趣集中在Hopf C^*代数及其表示理论、量子场代数及其内部对称结构以及非交换空间理论，并于2006年入选教育部新世纪优秀人才资助计划。