In computability theory, a Π01 class is a subset of 2ω of a certain form. These classes are of interest as technical tools within recursion theory and effective descriptive set theory. They are also used in the application of recursion theory to other branches of mathematics (Cenzer 1999, p. 39).
The set 2<ω consists of all finite sequences of 0s and 1s, while the set 2ω consists of all infinite sequences of 0s and 1s (that is, functions from ω = {0, 1, 2, ...} to the set {0,1}).
A tree on 2<ω is a subset of 2<ω that is closed under taking initial segments. An element f of 2ω is a path through a tree T on 2<ω if every finite initial segment of f is in T.
A (lightface) Π01 class is a subset C of 2ω for which there is a computable tree T such that C consists of exactly the paths through T. A boldface Π01 class is a subset D of 2ω for which there is an oracle f in 2ω and a subtree tree T of 2< ω from computable from f such that D is the set of paths through T.
As effectively closed setsedit
The boldface Π01 classes are exactly the same as the closed sets of 2ω and thus the same as the boldface Π01 subsets of 2ω in the Borel hierarchy.
Lightface Π01 classes in 2ω (that is, Π01 classes whose tree is computable with no oracle) correspond to effectively closed sets. A subset B of 2ω is effectively closed if there is a recursively enumerable sequence ⟨σi : i ∈ ω⟩ of elements of 2< ω such that each g ∈ 2ω is in B if and only if there exists some i such that σi is an initial segment of B.
Relationship with effective theoriesedit
For each effectively axiomatized theory T of first-order logic, the set of all completions of T is a class. Moreover, for each subset S of there is an effectively axiomatized theory T such that each element of S computes a completion of T, and each completion of T computes an element of S (Jockusch and Soare 1972b).
Cenzer, Douglas (1999), " classes in computability theory", Handbook of computability theory, Stud. Logic Found. Math., vol. 140, Amsterdam: North-Holland, pp. 37 85, MR 1720779
Jockush, Carl G.; Soare, Robert I. (1972a), "Degrees of members of classes." (PDF), Pacific Journal of Mathematics, 40 (3): 605–616, doi:10.2140/pjm.1972.40.605
Jockush, Carl G.; Soare, Robert I. (1972b), " Classes and Degrees of Theories", Transactions of the American Mathematical Society, 173: 33–56, doi:10.1090/s0002-9947-1972-0316227-0
January 01, 1970
class, computability, theory, Π01, class, subset, certain, form, these, classes, interest, technical, tools, within, recursion, theory, effective, descriptive, theory, they, also, used, application, recursion, theory, other, branches, mathematics, cenzer, 1999. In computability theory a P01 class is a subset of 2w of a certain form These classes are of interest as technical tools within recursion theory and effective descriptive set theory They are also used in the application of recursion theory to other branches of mathematics Cenzer 1999 p 39 Contents 1 Definition 2 As effectively closed sets 3 Relationship with effective theories 4 See also 5 ReferencesDefinition editThe set 2 lt w consists of all finite sequences of 0s and 1s while the set 2w consists of all infinite sequences of 0s and 1s that is functions from w 0 1 2 to the set 0 1 A tree on 2 lt w is a subset of 2 lt w that is closed under taking initial segments An element f of 2w is a path through a tree T on 2 lt w if every finite initial segment of f is in T A lightface P01 class is a subset C of 2w for which there is a computable tree T such that C consists of exactly the paths through T A boldface P01 class is a subset D of 2w for which there is an oracle f in 2w and a subtree tree T of 2 lt w from computable from f such that D is the set of paths through T As effectively closed sets editThe boldface P01 classes are exactly the same as the closed sets of 2w and thus the same as the boldface P01 subsets of 2w in the Borel hierarchy Lightface P01 classes in 2w that is P01 classes whose tree is computable with no oracle correspond to effectively closed sets A subset B of 2w is effectively closed if there is a recursively enumerable sequence si i w of elements of 2 lt w such that each g 2w is in B if and only if there exists some i such that si is an initial segment of B Relationship with effective theories editFor each effectively axiomatized theory T of first order logic the set of all completions of T is a P 1 0 displaystyle Pi 1 0 nbsp class Moreover for each P 1 0 displaystyle Pi 1 0 nbsp subset S of 2 w displaystyle 2 omega nbsp there is an effectively axiomatized theory T such that each element of S computes a completion of T and each completion of T computes an element of S Jockusch and Soare 1972b See also editArithmetical hierarchy Basis theorem computability References editCenzer Douglas 1999 P 1 0 displaystyle Pi 1 0 nbsp classes in computability theory Handbook of computability theory Stud Logic Found Math vol 140 Amsterdam North Holland pp 37 85 MR 1720779 Jockush Carl G Soare Robert I 1972a Degrees of members of P 1 0 displaystyle Pi 1 0 nbsp classes PDF Pacific Journal of Mathematics 40 3 605 616 doi 10 2140 pjm 1972 40 605 Jockush Carl G Soare Robert I 1972b P 1 0 displaystyle Pi 1 0 nbsp Classes and Degrees of Theories Transactions of the American Mathematical Society 173 33 56 doi 10 1090 s0002 9947 1972 0316227 0 Retrieved from https en wikipedia org w index php title P01 class amp oldid 1146198026, wikipedia, wiki, book, books, library,
