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List of topologies

From Wikipedia, the free encyclopedia

The following is a list of named topologies or topological spaces, many of which are counterexamples in topology and related branches of mathematics. This is not a list of properties that a topology or topological space might possess; for that, see List of general topology topics and Topological property.

Discrete and indiscrete

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Cardinality and ordinals

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Finite spaces

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Integers

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  • Arens–Fort space − A Hausdorff, regular, normal space that is not first-countable or compact. It has an element (i.e. ) for which there is no sequence in that converges to but there is a sequence in such that is a cluster point of
  • Arithmetic progression topologies
  • The Baire space with the product topology, where denotes the natural numbers endowed with the discrete topology. It is the space of all sequences of natural numbers.
  • Divisor topology
  • Partition topology

Fractals and Cantor set

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Orders

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Manifolds and complexes

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Hyperbolic geometry

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Paradoxical spaces

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  • Lakes of Wada − Three disjoint connected open sets of or that they all have the same boundary.

Unique

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Embeddings and maps between spaces

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Counter-examples (general topology)

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The following topologies are a known source of counterexamples for point-set topology.

Topologies defined in terms of other topologies

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Natural topologies

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List of natural topologies.

Compactifications

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Compactifications include:

Topologies of uniform convergence

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This lists named topologies of uniform convergence.

Other induced topologies

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  • Box topology
  • Compact complement topology
  • Duplication of a point: Let be a non-isolated point of let be arbitrary, and let Then is a topology on and and have the same neighborhood filters in In this way, has been duplicated.[1]
  • Extension topology

Functional analysis

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Operator topologies

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Tensor products

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Probability

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Other topologies

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See also

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Citations

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  1. ^ Wilansky 2008, p. 35.

References

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