Read More
Date: 10-7-2021
1123
Date: 22-5-2021
1487
Date: 25-7-2021
1645
|
A band over a fixed topological space is represented by a cover , , and for each , a sheaf of groups on along with outer automorphisms satisfying the cocycle conditions and . Here, restrictions of the cover to a finer cover should be viewed as defining the exact same band.
The collection of all bands over the space with respect to a single cover has a natural category structure. Indeed, if and are two bands over with respect to , then an isomorphism consists of outer automorphisms compatible on overlaps so that . The collection of all such bands and isomorphisms thereof forms a category.
The notion of band is essential to the study of gerbes (Moerdijk). In particular, for a gerbe over a topological space , one can choose an open cover of by open subsets , and for each , an object which together form a sheaf of groups on . One can then consider a collection of sheaf isomorphisms between any two groups and which forms a collection of well-defined outer automorphisms.
In some literature, an alternative definition of gerbe is used, thereby resulting in an even more specific definition of band. For example, the associated band of some gerbe is sometimes assumed to be a sheaf of Lie groups (Brylinski 1993), though such assumptions appear to be somewhat rare.
REFERENCES:
Brylinski, J. Loop Spaces, Characteristic Classes, and Geometric Quantization. Boston, MA: Birkhäuser, 1993.
Moerdijk, I. "Introduction to the Language of Stacks and Gerbes." 2002. http://arxiv.org/abs/math/0212266.
|
|
"عادة ليلية" قد تكون المفتاح للوقاية من الخرف
|
|
|
|
|
ممتص الصدمات: طريقة عمله وأهميته وأبرز علامات تلفه
|
|
|
|
|
قسم التربية والتعليم يكرّم الطلبة الأوائل في المراحل المنتهية
|
|
|