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An Arithmetical Hierarchy of the Laws of Excluded
Middle and Related PrinciplesLICS 2004, Turku, Finland
Yohji Akama (Tohoku University)
Stefano Berardi (Turin University)
Susumu Hayashi (Kobe University)
Ulrich Kohlenbach (Darmstadt University)
Acknoledgements
Our research was supported by: 1. the Grant in Aid for Scientific Research of
Japan Society of the Promotion of Science2. the McTati Research Project (constructive
methods in Topology, Algebra and Computer Science).
3. the Grant from the Danish Natural Science Research Council.
The subject of this talk
We are concerned with classifying classical principles from a constructive viewpoint.
Some motivations for our research work
• Limit Interpretation for non-constructive proofs: see Susumu Hayashi’s homepage.
http://www.shayashi.jp/PALCM/index-eng.html
• Effective Bound Extraction from partially non-constructive proofs: (see Ulrich Kohlenbach’s homepage.
http://www.mathematik.tu-darmstadt.de/~kohlenbach/novikov.ps.gz
Some Classical Principles we are concerned with
We compare up to provability in HA (Heyting’s Intuitionistic Arithmetic):
1. Post’s Theorem2. Markov’s Principle
3. 01-Lesser Limited Principle of
Omniscience.
4. Excluded Middle for 01-predicates
5. Excluded Middle for 01-predicates
Post’s Theorem
Markov Principle
01-L.L.P.O.
01-Ex. Middle
01-Ex. Middle
Theorem 1. The only implications provable in HA are:
No principle in this picture
is provable in HA
Post’s Theorem
“Any subset of N which both positively and negatively decidable is decidable”
• Equivalently, in HA: for any P,Q01
z: ( x.P(x,z) y.Q(y,z) ) x.P(x,z) x. P(x,z)
• Post’s Theorem is not derivable in HA. It is strictly weaker in HA than any other classical principle we considered.
Markov’s Principle
“Any computation which does not run foverer eventually stops”
• Equivalently, in HA: for any P01
z: x.P(x,z) x.P(x,z)
• Markov’s Principle is independent from 01-
Lesser Limited Principles of Omniscience in HA.
01-Lesser Limited Principles of
Omniscience“If two positively decidable statements are
not both true, then some of them is false”
• Equivalently, in HA: for any P,Q01
z: x,y.(P(x,z) Q(y,z))
x.P(x,z) y.Q(y,z)
01- L.L.P.O and
Weak Koenig’s Lemma0
1- L.L.P.O is equivalent, in HA+Choice, to:
Weak Koenig’s Lemma for recursive trees
“any infinite binary recursive tree has some infinite branch”
Excluded Middle for 0
1-predicates“Excluded Middle holds for all
negatively decidable statements”
• Equivalently, in HA: for any P01
z: x.P(x,z) x.P(x,z)0
1-E.M. is, in HA, stronger than 01-LLPO
(i.e., than Koenig’s Lemma), but weaker than 0
1-E.M..
Excluded Middlefor 0
1-predicates“Excluded Middle holds for all
positively decidable statements”
• Equivalently, in HA: for any P01
z: x.P(x,z) x.P(x,z) 0
1-E.M. is stronger, in HA, than all classical principles we considered until now.
Generalizing to higher degrees
• For each principle there is a degree n version, for degree n formulas.
• For degree n principles we proved the same classification results we proved for the originary principles.
n-Post’s Theorem
n-Markov’s Principle
n-Koenig’s Lemma
0n-Ex. Middle
0n-Ex. Middle
Theorem 2. For all n, the only implications provable
in HA are:
0n-1-Ex. Middle
… …
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