Given $A$ and $B$ are closed sets in a topological group $G$, how can I show $AB=\{ab | a\in$ A and $b \in B\}$ is closed in $G$? All we have learned so far is the definition of a topological group. (And the point-set topology until the beginning of quotient topology).
2026-03-27 01:46:58.1774576018
Set product of two closed subspaces of a topological group
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