Principal G-object
in a category
A concept in the theory of categories, instances of which are a principal fibre bundle in topology, a principal homogeneous space in algebraic geometry, etc. Let 
be a group object in a category 
with products and final object 
. An object 
is said to be a 
-object if there is given a morphism 
for which the following diagrams are commutative:
 |
Here 
is the group law morphism on 
, while 
is the unit element morphism into 
. More precisely, the 
-objects specified as above are called right 
-objects; the definition of left 
-objects is similar. As an example of a 
-object one may take the group object 
itself, for which 
coincides with 
. This object is called the trivial 
-object. The 
-objects in the category 
form a category 
. The morphisms are morphism 
of 
which commute with 
(i.e. such that 
). A 
-object is said to be a formal principal 
-object if the morphisms 
and 
induce an isomorphism 
. If 
is some Grothendieck topology on the category 
, a formal principal 
-object 
is called a principal 
-object (with respect to the topology 
) if there exists a covering 
of the final object such that for any 
the product 
is isomorphic to the trivial 
-object.
Examples.
1) If 
is the category of sets and 
is a group, then the non-empty 
-objects are called 
-sets. These are sets 
for which a mapping 
(
) is defined such that for any 
one has 
, and for any 
it is true that 
. A principal 
-object is a 
-set in which for any 
there exists a unique element 
such that 
(a principal homogeneous 
-set). If 
is not empty, the choice of a 
determines a mapping 
which establishes an isomorphism between 
and the trivial 
-set 
. Thus, in any topology a formal principal 
-object is a principal 
-object.
2) If 
is a differentiable manifold and 
is a Lie group, then, taking 
to be the category of fibrations over 
, taking as group object 
the projection 
, and defining a topology in 
with the aid of families of open coverings, it is possible to obtain the definition of a principal 
-fibration.
If 
is a formal principal 
-object in a category 
, then for any object 
in the category 
the set 
is either empty or is a principal homogeneous 
-set.
A formal principal 
-object 
is isomorphic to the trivial 
-object if and only if there exists a section 
. The set of isomorphism classes of formal principal 
-objects is denoted by 
. If 
is an Abelian group object, then the set 
, with the class of trivial 
-objects as a base point, is a group and can be computed by standard tools of homological algebra. In general, in the computation of 
Čech homology constructions are employed (cf. Non-Abelian cohomology).
References
| [1] | A. Grothendieck (ed.) et al. (ed.) , Revêtements étales et groupe fondamental. SGA 1 , Lect. notes in math. , 224 , Springer (1971) MR0354651 Zbl 1039.14001 |
Comments
Formal principal 
-objects are commonly called 
-torsors. The distinction between formal principal 
-objects and principal 
-objects is not a profound one: a necessary and sufficient condition for a formal principal 
-object 
to be principal is that the unique morphism 
should form a covering of 
.
References
| [a1] | J. Giraud, "Cohomologie non abélienne" , Springer (1971) MR0344253 Zbl 0226.14011 |
Principal G-object. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Principal_G-object&oldid=14516