Loop space
In topology, a branch of mathematics, the loop space ΩX of a pointed topological space X is the space of based maps from the circle S1 to X with the compact-open topology. Two elements of a loop space can be naturally concatenated. With this concatenation operation, a loop space is an A∞-space. The adjective A∞ describes the manner in which concatenating loops is homotopy coherently associative.
The quotient of the loop space ΩX by the equivalence relation of pointed homotopy is the fundamental group π1(X).
The iterated loop spaces of X are formed by applying Ω a number of times.
An analogous construction of topological spaces without basepoint is the free loop space. The free loop space of a topological space X is the space of maps from S1 to X with the compact-open topology. That is to say, the free loop space of a topological space X is the function space . The free loop space of X is denoted by .
The free loop space construction is right adjoint to the cartesian product with the circle, while the loop space construction is right adjoint to the reduced suspension. This adjunction accounts for much of the importance of loop spaces in stable homotopy theory.
Relation between homotopy groups of a space and those of its loop space
The basic relation between the homotopy groups is .[1]
More generally,
where, is the set of homotopy classes of maps , and is the suspension of A. In general does not have a group structure for arbitrary spaces and . However, it can be shown that and do have natural group structures when and are pointed, and the aforesaid isomorphism is of those groups. [2]
Note that setting (the sphere) gives the earlier result.
See also
- fundamental group
- path (topology)
- loop group
- free loop
- quasigroup
- Spectrum (topology)
- Eilenberg–MacLane space
References
- ↑ http://topospaces.subwiki.org/wiki/Loop_space_of_a_based_topological_space
- ↑ May, J. P. (1999), "8", A Concise Course in Algebraic Topology (PDF), U. Chicago Press, Chicago, retrieved 2008-09-27 (chapter 8, section 2)
- Adams, John Frank (1978), Infinite loop spaces, Annals of Mathematics Studies 90, Princeton University Press, ISBN 978-0-691-08207-3, MR 505692
- May, J. Peter (1972), The Geometry of Iterated Loop Spaces, Berlin, New York: Springer-Verlag, doi:10.1007/BFb0067491, ISBN 978-3-540-05904-2, MR 0420610