Meital Posted September 6, 2005 Posted September 6, 2005 Can someone give me an example of a topology, which is not sigma algebra?
matt grime Posted September 6, 2005 Posted September 6, 2005 A sigma algebra is closed under the operation of complements. Give me a topology (ie a collection of open sets) that is not closed under complements (pretty much most of the ones you can think of, I imagine)
Meital Posted September 6, 2005 Author Posted September 6, 2005 I see, so we can take the colletion: R ( real numbers), open set (0,2), and the empty set. This is topology since it satisfies all 3 axioms of topology, but not sigma-algebra because we don't have the comp of (0,2) in the collection.
matt grime Posted September 6, 2005 Posted September 6, 2005 well, that is an odd example to me, but works. R with its usual metric topology was the obvious example.
Haroon Stephen Posted June 26, 2018 Posted June 26, 2018 On 9/6/2005 at 2:26 AM, Meital said: Can someone give me an example of a topology, which is not sigma algebra? For a set S={1,2,3} consider T={{ }, {1,2}, {2}, {2,3}, S}. T is a topology but not a sigma-algebra.
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