0708-1300/Class notes for Tuesday, February 5

From Drorbn
Revision as of 18:32, 4 February 2008 by Drorbn (talk | contribs)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigationJump to search
Announcements go here
In Preparation

The information below is preliminary and cannot be trusted! (v)

Unbased Covering Spaces

Let be a topological space and let be the category of covering spaces of : The category whose objects are (unbased!) coverings and whose morphisms are maps between such coverings that commute with the covering projections - a morphism between and is a map so that the diagram below is commutative:

0708-1300-MorphismBetweenCoverings.png

Every topologists' highest hope is to find that her/his favourite category of topological objects is equivalent to some category of easily understood algebraic objects. The following theorem realizes this dream in full in the case of the category of covering spaces of any reasonable base space :

Theorem 1. (Classification of covering spaces)

  • If is connected and locally connected with base point and fundamental group , then the map which assigns to every covering its fiber over the basepoint induces a functor from the category of coverings of to the category of -sets - sets with a right -action and set maps that respect the action.
  • If in addition is semi-locally simply connected then the functor is an equivalence of categories. (In fact, this is iff).

If indeed the categories and are equivalent, one should be able to extract everything topological about a covering from its associated -set . The following theorem shows this to be right in at least two ways:

Theorem 2.

  • The set of connected components of is in a bijective correspondence with the set of orbits of in .
  • Let be a basepoint for that covers the basepoint of . Then the fundamental group is isomorphic via the projection into to the stabilizer group of in .

(Both assertions of this theorem can be sharpened to deal with morphisms as well, but we will not bother to do so).

Based Covering Spaces

There are similar theorems (call them theorem 1' and theorem 2') relating the category of based covering spaces with the category of based -sets.

The Main Point

Ok. Every math technician can spend some time and effort and understand the statements and (only then) the proofs of these two theorems. Your true challenge is to digest the following statement:


All there is to know about covering spaces follows from these two theorems


In particular, the following facts are all simple algebraic corollaries of these theorems:

Corollary 1. If is connected then its covering number (="number of decks") is equal to the index of in , and the decks of are in a non-canonical correspondence with the left cosets of in .

Corollary 2. If is semi-locally simply connected, there exists a unique (up to base-point-preserving isomorphism) "universal covering space of " (a connected and simply connected covering ).

Corollary 3. The group of automorphisms of the universal covering is equal to .

Corollary 4. .

Corollary 5. .

Corollary 6. If is semi-locally simply connected, then for every there is a unique (up to base-point-preserving isomorphism) connected covering space with .

Corollary 7. If for are connected coverings of with groups and if then is a covering of of covering number .

Corollary 8. If is semi-locally simply connected there is a bijection between conjugacy classes of subgroups of and unbased connected coverings of .

Corollary 9. A connected covering is normal (for any theres an automorphism of with ) iff its group is normal in .

Corollary 10. If is a connected covering of and , then where is the normalizer of in .

Proposition 11. If we forgot anything, it follows too.

Steps in the proofs of Theorem 1 and 2

  1. Use path liftings to construct a right action of on .
  2. Show that this is indeed a group action and that morphisms of coverings induce morphisms of right -sets.
  3. Start the construction of an "inverse" functor of : Use spelunking (cave exploration) to construct a universal covering of , if is semi-locally simply connected.
  4. Show that .
  5. Use the construction of or the general lifting property for covering spaces to show that there is a left action of on .
  6. For a general right -set set and show that is a covering of and .
  7. Show that is compatible with maps between right -sets.
  8. Understand the relationship between connected components and orbits.
  9. Prove Theorem 2.
  10. Use the existence and uniqueness of lifts to show that is equivalent to the identity functor (working connected component by connected component).

A Deep Thought Question

What does it at all mean " is equivalent to the identity functor" (and first, why can't it simply be the identity functor)? And even harder, what does it at all mean for two categories to be "equivalent"? If you answer this question correctly, you'll probably re-invent the notions of "natural transformation between two functors" and "natural equivalence", that gave the historical impetus for the development of category theory.