Metric space: Difference between revisions

Revision as of 23:48, 1 February 2008

Definition

A metric space is a set $X$ along with a distance function $d : X \times X \to R$ such that the following hold:

$d (x, y) \geq 0$ (non-negativity)
$d (x, x) = 0 ⟺ x = 0$ (identity of indiscernibles)
$d (x, y) = d (y, x)$ (symmetry)
$d (x, y) + d (y, z) \geq d (x, z)$ (triangle inequality)

A distance function satisfying all the above three conditions is termed a metric.

Induced topology

Further information: Metric induces topology

There is a natural induced topology on any metric space: the topology whose basis is open balls of positive radii about points in the metric space. Here, by open ball of radius $r$ about $x$ we mean the set of points $y$ such that $d (x, y) < r$ .

A topological space which arises via the induced topology on a metric space, is termed metrizable. There may be many different metrics yielding the same topology, for instance the taxicab metric and the Euclidean metric for Euclidean space.

Facts

The metric is a jointly continuous function from the metric space to $R$ . This follows from the various axioms for the function. For full proof, refer: Metric is jointly continuous
The topology arising from the metric induced no a subspace (by restricting the metric from the whole space) is the same as the subspace topology arising from the whole space. For full proof, refer: topology from subspace metric equals subspace topology

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 ==Induced topology==
+{{further|[[Metric induces topology]]}}
 There is a natural induced topology on any metric space: the topology whose basis is open balls of positive radii about points in the metric space. Here, by open ball of radius <math>r</math> about <math>x</math> we mean the set of points <math>y</math> such that <math>d(x,y) < r</math>.