Metric topology

From Conservapedia

The Metric topology is the topology T induced by the metric d defined on a metric space (X, d). Its open sets are generated by arbitrary unions and finite intersections of metric balls about each point (a metric ball of radius r about x being the set of points y with d(x,y)<r). The metric topology makes X a Hausdorff space.^[1]

References

1. ↑ http://mathworld.wolfram.com/MetricTopology.html