Semitopological group mathematics , a semitopological group is a topological space with a group action that is continuous with respect to each variable considered separately. It is a weakening of the concept of a topological group ; all topological groups are semitopological groups but the converse does not hold.A semitopological group is a topological space that is also a group such thatClearly , every topological group is a semitopological group. To see that the converse does not hold, consider the real line with its usual structure as an additive abelian group . Apply the semiopen topology to with topological basis the family . Then is continuous, but is not continuous at 0: is an open neighbourhood of 0 but there is no neighbourhood of 0 continued in.locally compact Hausdorff semitopological group is a topological group. Other similar results are also known.
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