Sober space: Difference between revisions
Jump to navigation
Jump to search
imported>Bruce M. Tindall mNo edit summary |
mNo edit summary |
||
Line 9: | Line 9: | ||
* {{cite book | author=Peter T. Johnstone | title=Sketches of an elephant | series=Oxford Logic Guides | publisher=[[Oxford University Press]] | year=2002 | isbn=0198534256 | pages=491-492 }} | * {{cite book | author=Peter T. Johnstone | title=Sketches of an elephant | series=Oxford Logic Guides | publisher=[[Oxford University Press]] | year=2002 | isbn=0198534256 | pages=491-492 }} | ||
* {{cite book | author=Maria Cristina Pedicchio | coauthors=Walter Tholen | title=Categorical Foundations: Special Topics in Order, Topology, Algebra, and Sheaf Theory | publisher=[[Cambridge University Press]] | year=2004 | isbn=0-521-83414-7 | pages=54-55 }} | * {{cite book | author=Maria Cristina Pedicchio | coauthors=Walter Tholen | title=Categorical Foundations: Special Topics in Order, Topology, Algebra, and Sheaf Theory | publisher=[[Cambridge University Press]] | year=2004 | isbn=0-521-83414-7 | pages=54-55 }} | ||
* {{cite book | author=Steven Vickers | title=Topology via Logic | publisher=[[Cambridge University Press]] | year=1989 | isbn=0-521-36062-5 | pages=66 }} | * {{cite book | author=Steven Vickers | title=Topology via Logic | publisher=[[Cambridge University Press]] | year=1989 | isbn=0-521-36062-5 | pages=66 }}[[Category:Suggestion Bot Tag]] |
Latest revision as of 12:01, 19 October 2024
In general topology and logic, a sober space is a topological space in which every irreducible closed set has a unique generic point. Here a closed set is irreducible if it is not the union of two non-empty proper closed subsets of itself.
Any Hausdorff space is sober, since the only irreducible subsets are singletons. Any sober spaces is a T0 space. However, sobriety is not equivalent to the T1 space condition: an infinite set with the cofinite topology is T1 but not sober whereas a Sierpinski space is sober but not T1.
A sober space is characterised by its lattice of open sets. An open set in a sober space is again a sober space, as is a closed set.
References
- Peter T. Johnstone (2002). Sketches of an elephant. Oxford University Press, 491-492. ISBN 0198534256.
- Maria Cristina Pedicchio; Walter Tholen (2004). Categorical Foundations: Special Topics in Order, Topology, Algebra, and Sheaf Theory. Cambridge University Press, 54-55. ISBN 0-521-83414-7.
- Steven Vickers (1989). Topology via Logic. Cambridge University Press, 66. ISBN 0-521-36062-5.