Über die mit Stackautomaten berechenbaren Funktionen.
Über Hilbert's reale und ideale Elemente.
Undecidability of topological and arithmetical properties of infinitary rational relations
We prove that for every countable ordinal one cannot decide whether a given infinitary rational relation is in the Borel class (respectively ). Furthermore one cannot decide whether a given infinitary rational relation is a Borel set or a -complete set. We prove some recursive analogues to these properties. In particular one cannot decide whether an infinitary rational relation is an arithmetical set. We then deduce from the proof of these results some other ones, like: one cannot decide whether...
Undecidability of Topological and Arithmetical Properties of Infinitary Rational Relations
We prove that for every countable ordinal α one cannot decide whether a given infinitary rational relation is in the Borel class (respectively ). Furthermore one cannot decide whether a given infinitary rational relation is a Borel set or a -complete set. We prove some recursive analogues to these properties. In particular one cannot decide whether an infinitary rational relation is an arithmetical set. We then deduce from the proof of these results some other ones, like: one cannot decide...
Undecidability vs transfinite induction for the consistency of hyperarithmetical sets.