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Show that if s has more than one point a separated


A uniform space (S, U ) is called separated iff for every x /= y in S, there is a U ∈ U with (x, y) ∈/ U .

(a) Show that the uniform topology of a separated uniformity is always Hausdorff.

(b) Show that if S has more than one point, a separated uniformity never converges as a filter for its product topology.

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Basic Statistics: Show that if s has more than one point a separated
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