Cantor set: Difference between revisions
imported>Richard Pinch (expanded; subpages) |
imported>Richard Pinch m (typo) |
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in which the open sets are generated by the ''cylinders'', of the form | in which the open sets are generated by the ''cylinders'', of the form | ||
:C_s = \left\lbrace (x_n) \in C : x_n = s_n for n=0,\ldots,k-1 \right\rbrace , \,</math> | :<math> C_s = \left\lbrace (x_n) \in C : x_n = s_n for n=0,\ldots,k-1 \right\rbrace , \,</math> | ||
where ''s'' is a given binary sequence of length ''k''. | where ''s'' is a given binary sequence of length ''k''. | ||
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The Cantor set may be embedded in the unit interval by the map | The Cantor set may be embedded in the unit interval by the map | ||
:<math>f : \mathbf{x} \mapsto \sum_{n=0}^\infty 2x_n.3^{-n-1} | :<math>f : \mathbf{x} \mapsto \sum_{n=0}^\infty 2x_n.3^{-n-1} </math> | ||
which is a homeomorphism onto the subset of the unit interval obtained by iteratively deleting the middle third of each interval. | which is a homeomorphism onto the subset of the unit interval obtained by iteratively deleting the middle third of each interval. |
Revision as of 06:34, 2 November 2008
The Cantor set is a topological space which may be obtained as a fractal generated by removing the middle third of a line segment on each iteration: as such it has a Hausdorff dimension of ln(2)/ln(3), which is approximately 0.63.
Topological properties
The Cantor set is homeomorphic to a product of countably many copies of a two-point space with the discrete metric. It is thus compact. It may be realised as the space of binary sequences
in which the open sets are generated by the cylinders, of the form
where s is a given binary sequence of length k.
The Cantor set is uncountable, compact, second countable, dense-in-itself, totally disconnected.
Metric properties
The topology on the countable product of the two-point space D is induced by the metric
where is the discrete metric on D.
The Cantor set is complete with respect to d.
Embedding in the unit interval
The Cantor set may be embedded in the unit interval by the map
which is a homeomorphism onto the subset of the unit interval obtained by iteratively deleting the middle third of each interval.