Subspace metric: Difference between revisions

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(New page: ==Definition== Suppose <math>(X,d_X)</math> is a defining ingredient::metric space, and <math>Y \subseteq X</math>. The '''subspace metric''' on <math>Y</math> is defined by simply re...)
 
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{{induced subspace structure|metric space}}
==Definition==
==Definition==



Latest revision as of 01:23, 25 November 2008

This article describes the induced structure on any subset (subspace) corresponding to a particular structure on a set: the structure of a metric space
View other induced structures on subspaces

Definition

Suppose (X,dX) is a metric space, and YX. The subspace metric on Y is defined by simply restricting the metric on X to points in Y. In other words, for a,bY, we define dY(a,b)=dX(a,b).

Note that if we start with a geodesic metric space, the subspace metric on a subspace need not be a geodesic metric any more.