The quotient spaces of topological groups with a q-point
Abstract
In this paper, we study the uniformities on the double coset spaces in topological groups. As an implication, the quotient spaces of topological groups with a q-point are studied. It mainly shows that: (1) Suppose that G is a topological group with a q-point and H is a closed subgroup of G; then the quotient space G/H is an open and quasi-perfect preimage of a metrizable space; in particular, G/H is an M-space. (2) Suppose that G is a topological group with a strict q-point and H is a closed subgroup of G; then the quotient space G/H is an open and sequentially perfect preimage of a metrizable space. (3) Suppose that G is a topological group with a strong q-point and H is a closed subgroup of G; then the quotient space G/H is an open and strongly sequentially perfect preimage of a metrizable space.
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