- #1
tomboi03
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The integers Z are a normal subgroup of (R,+). The quotient R/Z is a familiar topological group; what is it?
okay... i attempted this problem...
and I don't know if i did it right... but can you guys check it?
Thanks~
R/Z is a familiar topological group
and Z are a normal subgroup of (R,+)
then the quotient R/Z is also a topological group with the quotient topology.
The R/Z is Hausdorff iff Z is a closed subset of (R,+) which in this case is true.
Therefore, R/Z is a quotient topology.
sorry if there are a lot of things that didn't make sense in that proof but i tried... hahaha
okay... i attempted this problem...
and I don't know if i did it right... but can you guys check it?
Thanks~
R/Z is a familiar topological group
and Z are a normal subgroup of (R,+)
then the quotient R/Z is also a topological group with the quotient topology.
The R/Z is Hausdorff iff Z is a closed subset of (R,+) which in this case is true.
Therefore, R/Z is a quotient topology.
sorry if there are a lot of things that didn't make sense in that proof but i tried... hahaha