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引用次数: 0
摘要
本文介绍了在赋有辫状张量积的分级霍普夫代数框架内获得的辫状马约拉纳费米子的准统计特性。编织特性被编码在一个与亚历山大-康威多项式相关的、依赖于 t 的 4×4 编织矩阵 B_tBt 中。非消失复参数 t 定义了编织准统计量。在 t=1 时,普通费米子被恢复。统一根的 t 值被划分为若干等级,这些等级规定了多粒子扇形中编织马约拉纳费米子的最大数量。t 的一般值和 t=-1 的统一根模仿了普通玻色子的行为。
This paper presents the parastatistics of braided Majorana fermions obtained in the framework of a graded Hopf algebra endowed with a braided tensor product. The braiding property is encoded in a t-dependent 4×4 braiding matrix B_tBt related to the Alexander-Conway polynomial. The nonvanishing complex parameter t defines the braided parastatistics. At t=1 ordinary fermions are recovered. The values of t at roots of unity are organized into levels which specify the maximal number of braided Majorana fermions in a multiparticle sector. Generic values of t and the t=-1 root of unity mimick the behaviour of ordinary bosons.
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