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#1 2008-08-16 07:54:54

JaneFairfax
Legendary Member

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Algebraic topology

I will summarize the results I developed and presented another thread in a more coherent and easier-to-follow fashion here. wink

1. HOMOTOPY

You have two topological spaces X and Y and two continuous functions

. Suppose for each
, there corresponds a continuous function
such that
and
for all
.

A continuous function
is callled a homotopy from f to g. We say that f and g are homotopic iff there exists a homotopy from f to g, and we write
; we can also express the fact that H is a homotopy from f to g by writing
.

The relation “is homotopic to” is an equivalence relation on
, the class of all continuous functions from X to Y.

(i) For any
, the function
is a homotopy from f to itself.

(ii) For any
, if
, then
is a homotopy from g to f.

(ii) For any
, if
and
, define
as follows.



Then
.

the equivalence classes under this equivalence relation are called homotopy classes.


Q: Who wrote the novels Mrs Dalloway and To the Lighthouse?

A: Click here for answer.
 

#2 2008-08-25 02:52:49

JaneFairfax
Legendary Member

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Re: Algebraic topology

2. RELATIVE HOMOTOPY

Let X, Y be topological spaces,

, and A a subset of X such that
for all
. If H is a homotopy from f to g such that
for all
, H is called a homotopy relative to A (or homotopy rel A) from f to g, and we can write
.

Like ordinary homotopy, relative homotopy is an equivalence relation on
. Indeed, if
, H is just an ordinary homotopy.


Q: Who wrote the novels Mrs Dalloway and To the Lighthouse?

A: Click here for answer.
 

#3 2008-09-15 02:41:32

JaneFairfax
Legendary Member

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Re: Algebraic topology

3. PATHS

Let X be a topological space and

. A path in X from a to b is a continuous function
with
and
.

If p is a path in X from a to b and q is a path in X from b to c, the product path
is the path from a to c defined by

                 


Q: Who wrote the novels Mrs Dalloway and To the Lighthouse?

A: Click here for answer.
 

#4 2008-09-15 03:11:45

LQ
Real Member

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Re: Algebraic topology

I'm amazed, sounds important


I see clearly now, the universe have the black dots, Thus I am on my way of inventing this remedy...
 

#5 2008-09-15 03:32:17

Ricky
Moderator

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Re: Algebraic topology

In differential geometry, you also define the set of paths to a point to be the tangent space at that point.  The paths are of the form:



Such that



Where M is your manifold.  We then use the tangent space to define what a "derivative" means.


"In the real world, this would be a problem.  But in mathematics, we can just define a place where this problem doesn't exist.  So we'll go ahead and do that now..."
 

#6 2008-09-15 03:46:22

JaneFairfax
Legendary Member

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Re: Algebraic topology

Thanks Ricky. big_smile

Later, when I come to n-dimensional homotopy groups, I will be defining n-dimensional paths as continuous functions from the n-dimensional hypercube to X – but for the time being I avoid jumping the gun. tongue


Q: Who wrote the novels Mrs Dalloway and To the Lighthouse?

A: Click here for answer.
 

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