Effective Polish space
In mathematical logic, an effective Polish space is a complete separable metric space that has a computable presentation. Such spaces are studied in effective descriptive set theory and in constructive analysis. In particular, standard examples of Polish spaces such as the real line, the Cantor set and the Baire space are all effective Polish spaces.
Definition
An effective Polish space is a complete separable metric space X with metric d such that there is a countable dense set C = (c0, c1,...) that makes the following two relations on computable (Moschovakis 2009:96-7):
gollark: Then how do I have Macron 2029?
gollark: Does Macron have an edition system?
gollark: Macron 1? Macron 2? Macron 3?
gollark: So which version of Macron has this?
gollark: Are we just ASSUMING matrices are square?
References
- Yiannis N. Moschovakis, 2009, Descriptive Set Theory, 2nd edition, American Mathematical Society. ISBN 0-8218-4813-5
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