User:IssaRice/Computability and logic/Bounded computation trick: Difference between revisions

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* the second graph principle
* the second graph principle
* goedel's beta function (this one is slightly different, i think)
* goedel's beta function (this one is slightly different, i think)
* definition of Prf(m,n) in logic

Revision as of 22:29, 24 March 2019

Instead of saying "compute this thing" you can say "compute this thing for n steps", then let n vary. This trick makes the computation bounded, which is useful in certain situations.

Some examples of this trick in use:

  • showing that a recursively enumerable set is primitive-recursively enumerable
  • Kleene's T predicate and normal form
  • Peter Smith's proof that domain of an algorithm implies effectively enumerable (theorem 3.5)
  • Peter Smith's proof that K is recursively enumerable (theorem 3.8)
  • the second graph principle
  • goedel's beta function (this one is slightly different, i think)
  • definition of Prf(m,n) in logic