Difference between revisions of "Moore space"
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| − | + | ==Homology== | |
| + | A topological space $ M $ | ||
| + | with a unique non-trivial reduced homology group: | ||
| − | + | $$ | |
| + | \widetilde{H} _ {k} ( M) = G ; \ \ | ||
| + | \widetilde{H} _ {i} ( M) = 0 ,\ \ | ||
| + | i \neq k . | ||
| + | $$ | ||
| − | + | If $ K ( \mathbf Z , n ) $ | |
| + | is the [[Eilenberg–MacLane space|Eilenberg–MacLane space]] of the group of integers $ \mathbf Z $ | ||
| + | and $ M _ {k} ( G) $ | ||
| + | is the Moore space with $ \widetilde{H} _ {k} ( M _ {k} ( G) ) = G $, | ||
| + | then | ||
| − | + | $$ | |
| + | \lim\limits _ {N \rightarrow \infty } \ | ||
| + | \left [ | ||
| + | \Sigma ^ {N+} k X , K ( \mathbf Z , N + n ) \wedge M _ {k} ( G) \right ] | ||
| + | \cong H ^ {n} ( X , G ) , | ||
| + | $$ | ||
| − | For | + | that is, $ \{ K ( \mathbf Z , n ) \wedge M _ {k} ( G) \} $ |
| + | is the spectrum of the cohomology theory $ H ^ {*} ( , G ) $. | ||
| + | This allows one to extend the idea of cohomology with arbitrary coefficients to a generalized cohomology theory. For any spectrum $ E $, | ||
| + | the spectrum $ E \wedge M _ {k} ( G) $ | ||
| + | defines a cohomology theory $ ( E \wedge M _ {k} ( G) ) ^ {*} $, | ||
| + | called the $ E ^ {*} $- | ||
| + | cohomology theory with coefficient group $ G $. | ||
| + | For the definition of generalized homology theories with coefficients in a group $ G $, | ||
| + | the so-called co-Moore space $ M ^ {k} ( G) $ | ||
| + | is used, which is characterized by | ||
| + | |||
| + | $$ | ||
| + | \widetilde{H} {} ^ {k} ( M ^ {k} ( G) ) = G ,\ \ | ||
| + | \widetilde{H} {} ^ {i} ( M ^ {k} ( G) ) = 0 ,\ \ | ||
| + | i \neq k . | ||
| + | $$ | ||
| + | |||
| + | For example, the group $ \pi _ {i} ( X , G ) = [ M ^ {k} ( G) , X ] $ | ||
| + | is called the homotopy group of the space $ X $ | ||
| + | with coefficients in $ G $. | ||
| + | However, the space $ M ^ {k} ( G) $ | ||
| + | does not exist for all pairs $ ( G , k ) $. | ||
| + | If $ G $ | ||
| + | is a finitely-generated group, then $ M ^ {k} ( G) $ | ||
| + | does exist. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> J.C. Moore, "On homotopy groups of spaces with a single non-vanishing homotopy group" ''Ann. of Math.'' , '''59''' : 3 (1954) pp. 549–557</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> J.C. Moore, "On homotopy groups of spaces with a single non-vanishing homotopy group" ''Ann. of Math.'' , '''59''' : 3 (1954) pp. 549–557</TD></TR></table> | ||
| − | |||
| − | |||
====Comments==== | ====Comments==== | ||
| − | For a construction of a Moore space as a CW-complex with one zero cell and further only cells in dimensions | + | For a construction of a Moore space as a CW-complex with one zero cell and further only cells in dimensions $ n $ |
| + | and $ n + 1 $, | ||
| + | cf. [[#References|[a1]]]. The Eilenberg–MacLane space $ K ( G , n ) $ | ||
| + | can be obtained from the Moore space $ M ( G , n ) $ | ||
| + | by killing the higher homotopy groups. | ||
| − | + | ====References==== | |
| − | + | <table> | |
| − | < | + | <TR><TD valign="top">[a1]</TD> <TD valign="top"> B. Gray, "Homotopy theory. An introduction to algebraic topology" , Acad. Press (1975) pp. §17</TD></TR> |
| + | </table> | ||
| − | in other words, | + | ==General topology== |
| + | In general topology, a Moore space is a [[regular space]] with a [[Refinement|development]]: a sequence $ \{ {\mathcal U} _ {n} \} _ {n} $ | ||
| + | of open coverings such that for every $ x $ | ||
| + | and every open set $ O $ | ||
| + | containing $ x $ | ||
| + | there is an $ n $ | ||
| + | such that | ||
| + | $$ | ||
| + | \mathop{\rm St} ( x , {\mathcal U} _ {n} ) = \cup | ||
| + | \{ {U \in {\mathcal U} _ {n} } : {x \in U } \} | ||
| + | \subseteq O ; | ||
| + | $$ | ||
| + | (in other words, $ \{ \mathop{\rm St} ( x , {\mathcal U} _ {x} ) \} _ {n} $ | ||
| + | is a [[neighbourhood base]] at $ x $.) | ||
| − | The idea of a development can be found in [[#References|[a4]]] (Axiom 1). Moore spaces are generalizations of metric | + | The idea of a development can be found in [[#References|[a4]]] (Axiom 1). Moore spaces are generalizations of [[metric space]]s and one can show that [[Collection-wise normal space|collectionwise normal]] Moore spaces are metrizable [[#References|[a2]]]. The question whether every normal Moore space is metrizable generated lots of research; its solution is described in [[#References|[a3]]]. |
====References==== | ====References==== | ||
| − | <table> | + | <table> |
| + | <TR><TD valign="top">[a2]</TD> <TD valign="top"> R.H. Bing, "Metrization of topological spaces" ''Canad. J. Math.'' , '''3''' (1951) pp. 175–186</TD></TR> | ||
| + | <TR><TD valign="top">[a3]</TD> <TD valign="top"> W.G. Fleissner, "The normal Moore space conjecture and large cardinals" K. Kunen (ed.) J.E. Vaughan (ed.) , ''Handbook of Set-Theoretic Topology'' , North-Holland (1984) pp. 733–760</TD></TR> | ||
| + | <TR><TD valign="top">[a4]</TD> <TD valign="top"> R.L. Moore, "Foundations of point set theory" , Amer. Math. Soc. (1962)</TD></TR> | ||
| + | </table> | ||
Latest revision as of 19:33, 20 January 2021
Homology
A topological space $ M $ with a unique non-trivial reduced homology group:
$$ \widetilde{H} _ {k} ( M) = G ; \ \ \widetilde{H} _ {i} ( M) = 0 ,\ \ i \neq k . $$
If $ K ( \mathbf Z , n ) $ is the Eilenberg–MacLane space of the group of integers $ \mathbf Z $ and $ M _ {k} ( G) $ is the Moore space with $ \widetilde{H} _ {k} ( M _ {k} ( G) ) = G $, then
$$ \lim\limits _ {N \rightarrow \infty } \ \left [ \Sigma ^ {N+} k X , K ( \mathbf Z , N + n ) \wedge M _ {k} ( G) \right ] \cong H ^ {n} ( X , G ) , $$
that is, $ \{ K ( \mathbf Z , n ) \wedge M _ {k} ( G) \} $ is the spectrum of the cohomology theory $ H ^ {*} ( , G ) $. This allows one to extend the idea of cohomology with arbitrary coefficients to a generalized cohomology theory. For any spectrum $ E $, the spectrum $ E \wedge M _ {k} ( G) $ defines a cohomology theory $ ( E \wedge M _ {k} ( G) ) ^ {*} $, called the $ E ^ {*} $- cohomology theory with coefficient group $ G $. For the definition of generalized homology theories with coefficients in a group $ G $, the so-called co-Moore space $ M ^ {k} ( G) $ is used, which is characterized by
$$ \widetilde{H} {} ^ {k} ( M ^ {k} ( G) ) = G ,\ \ \widetilde{H} {} ^ {i} ( M ^ {k} ( G) ) = 0 ,\ \ i \neq k . $$
For example, the group $ \pi _ {i} ( X , G ) = [ M ^ {k} ( G) , X ] $ is called the homotopy group of the space $ X $ with coefficients in $ G $. However, the space $ M ^ {k} ( G) $ does not exist for all pairs $ ( G , k ) $. If $ G $ is a finitely-generated group, then $ M ^ {k} ( G) $ does exist.
References
| [1] | J.C. Moore, "On homotopy groups of spaces with a single non-vanishing homotopy group" Ann. of Math. , 59 : 3 (1954) pp. 549–557 |
Comments
For a construction of a Moore space as a CW-complex with one zero cell and further only cells in dimensions $ n $ and $ n + 1 $, cf. [a1]. The Eilenberg–MacLane space $ K ( G , n ) $ can be obtained from the Moore space $ M ( G , n ) $ by killing the higher homotopy groups.
References
| [a1] | B. Gray, "Homotopy theory. An introduction to algebraic topology" , Acad. Press (1975) pp. §17 |
General topology
In general topology, a Moore space is a regular space with a development: a sequence $ \{ {\mathcal U} _ {n} \} _ {n} $ of open coverings such that for every $ x $ and every open set $ O $ containing $ x $ there is an $ n $ such that $$ \mathop{\rm St} ( x , {\mathcal U} _ {n} ) = \cup \{ {U \in {\mathcal U} _ {n} } : {x \in U } \} \subseteq O ; $$ (in other words, $ \{ \mathop{\rm St} ( x , {\mathcal U} _ {x} ) \} _ {n} $ is a neighbourhood base at $ x $.)
The idea of a development can be found in [a4] (Axiom 1). Moore spaces are generalizations of metric spaces and one can show that collectionwise normal Moore spaces are metrizable [a2]. The question whether every normal Moore space is metrizable generated lots of research; its solution is described in [a3].
References
| [a2] | R.H. Bing, "Metrization of topological spaces" Canad. J. Math. , 3 (1951) pp. 175–186 |
| [a3] | W.G. Fleissner, "The normal Moore space conjecture and large cardinals" K. Kunen (ed.) J.E. Vaughan (ed.) , Handbook of Set-Theoretic Topology , North-Holland (1984) pp. 733–760 |
| [a4] | R.L. Moore, "Foundations of point set theory" , Amer. Math. Soc. (1962) |
How to Cite This Entry:
Moore space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Moore_space&oldid=18047
Moore space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Moore_space&oldid=18047
This article was adapted from an original article by A.F. Kharshiladze (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article