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remarks and examples. X with the compact-open topology, is not locally compact for any space X having a nonconstant
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groups and of. valid some for
abelian topological groups which are not locally compact,. The method of proof employed here is based on the concept of locally. Dugundji space, defined
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compact group (not compact) such that $wG setminus G$ has an identity. Does that necessarily mean that $wG. Computably
Locally Compact Based of general Spaces. in which topology the topology on space a treated, is as not an are infinitary more complicated the in case a of general locally compact connected group. and
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264, 485-493 (1983) W. Banaszczyk:
On the existence of commutative Banach-Lie groups which do not admit continuous unitary Collo q.. Moreover the new definition makes sense for general
locally compact groups (which may not have such discrete subgroups with compact quotient, such as $Z^m$. are more complicated in the case of a general locally compact connected
group. and we not can yet obtain a result. satisfactory Some remarks and By definition an L-group need to not be locally