Category:Quotient Spaces
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This category contains results about Quotient Spaces in the context of Topology.
The quotient space of $S$ by $\RR$ is the topological space whose points are elements of the quotient set of $\RR$ and whose topology is $\tau_\RR$:
- $T_\RR := \struct {S / \RR, \tau_\RR}$
Pages in category "Quotient Spaces"
The following 15 pages are in this category, out of 15 total.
C
Q
- Quotient Space of Compact Space is Compact
- Quotient Space of Hausdorff Space is not necessarily Hausdorff
- Quotient Space of Real Line may be Indiscrete
- Quotient Space of Real Line may be Kolmogorov but not Fréchet
- Quotient Space of Real Line may not be Kolmogorov
- Quotients of Homeomorphic Spaces are Homeomorphic