Photo from archive.org
It has been established in [7–9] that a non-locally compact topological group G with a first-countable remainder can fail to be metrizable. On the other hand, it was shown in… Click to show full abstract
It has been established in [7–9] that a non-locally compact topological group G with a first-countable remainder can fail to be metrizable. On the other hand, it was shown in [6] that if some remainder of a topological group G is perfect, then this remainder is first-countable. We improve considerably this result below: it is proved that in the main case, when G is not locally compact, the space G is separable and metrizable. Some corollaries of this theorem are given, and an example is presented showing that the theorem is sharp.
Keywords:
remainder;
theorem remainders;
topological groups;
topology;
remainders topological
Journal Title: Topology and its Applications
Year Published: 2017
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!
Journal Title: Topology and its Applications
Year Published: 2017
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!