TC0: Difference between revisions

Revision as of 20:46, 3 February 2014

In the mathematical subject of topology, an ambient isotopy, also called an h-isotopy, is a kind of continuous distortion of an "ambient space", a manifold, taking a submanifold to another submanifold. For example in knot theory, one considers two knots the same if one can distort one knot into the other without breaking it. Such a distortion is an example of an ambient isotopy. More precisely, let N and M be manifolds and g and h be embeddings of N in M. A continuous map

F : M \times [0, 1] \to M

is defined to be an ambient isotopy taking g to h if F₀ is the identity map, each map F_t is a homeomorphism from M to itself, and F₁ ∘ g = h. This implies that the orientation must be preserved by ambient isotopies. For example, two knots which are mirror images of each other are in general not equivalent.

References

Armstrong, Basic Topology, Springer-Verlag, 1983

Template:Topology-stub

@@ Line 1: / Line 1: @@
-Golda is what's created on my beginning certificate  [http://www.chk.woobi.co.kr/xe/?document_srl=346069 tarot readings] even though it is not the title on my beginning certification. What me and my family members love is to climb but I'm thinking on starting some thing new. For years he's been living in Mississippi and he doesn't strategy on altering it. My working day job is a  free online tarot card readings ([http://www.octionx.sinfauganda.co.ug/node/22469 www.octionx.sinfauganda.co.ug]) travel agent.<br><br>Also visit my page :: best psychics ([http://203.250.78.160/zbxe/?document_srl=1792908 Highly recommended Online site])
+In the [[mathematics|mathematical]] subject of [[topology]], an '''ambient isotopy''', also called an ''h-isotopy'', is a kind of continuous distortion of an "ambient space", a [[manifold]], taking a [[submanifold]] to another submanifold. For example in [[knot theory]], one considers two [[knot (mathematics)|knot]]s the same if one can distort one knot into the other without breaking it. Such a distortion is an example of an ambient isotopy.  More precisely, let ''N'' and ''M'' be manifolds and ''g'' and ''h'' be [[embedding]]s of ''N'' in ''M''.  A [[continuous map]]
+:<math>F:M \times [0,1] \rightarrow M </math>
+is defined to be an ambient isotopy taking ''g'' to ''h'' if ''F<sub>0</sub>'' is the [[identity function|identity map]], each map ''F<sub>t</sub>'' is a [[homeomorphism]] from ''M'' to itself, and ''F<sub>1</sub>'' ∘ ''g'' = ''h''. This implies that the [[orientation (geometry)|orientation]] must be preserved by ambient isotopies. For example, two knots which are [[mirror image]]s of each other are in general not equivalent.
+==See also==
+*[[Regular homotopy]]
+*[[Regular isotopy]]
+== References ==
+*Armstrong, ''Basic Topology'', Springer-Verlag, 1983
+[[Category:Topology]]
+[[Category:Maps of manifolds]]
+{{topology-stub}}

TC0: Difference between revisions

Revision as of 20:46, 3 February 2014

See also

References

Navigation menu

Search