Talk:Gödel's β function

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Ich habe die Defintion von ${\displaystyle rem(x,y)}$ mal angepasst. Es muss Rest bei ${\displaystyle y/x}$ sein, anstatt ${\displaystyle x/y}$.

Im Beweis in Mendelson werden ${\displaystyle u_{i}}$ konstruiert, sodass ${\displaystyle rem(u_{i},b)=k_{i}}$ sein soll. Das ${\displaystyle b}$ soll es nach Chinesischem Restsatz geben. Dort sind die Moduln jedoch eben die ${\displaystyle u_{i}}$, sodass in ${\displaystyle rem}$ "durch sie geteilt" werden muss. —Preceding unsigned comment added by 88.74.91.131 (talk) 07:57, 6 August 2010 (UTC)[reply]

Danke. You're right that the variables were backwards. — Carl (CBM · talk) 13:23, 6 August 2010 (UTC)[reply]

Neither the β function nor the β lemma are mentioned in Gödel's incompleteness article:

Kurt Gödel: Über formal unentscheidbare Sätze der Principia Mathematica und verwandter Systeme I, Monatsheft für Mathematik und Physik, volume 38, pages 173-198, 1931

An English transaltion is given in

Solomon Feferman, John W. Dawson, Jr., Stephen C. Kleene, Gregory H. Moore, Robert M. Solovay, and Jean van Heijenoort, editors: Kurt Gödel - Collected Works, Oxford, UK, and New York, USA, pages 144-194

I believed the following: We can therefore safely assume that the β function nor the β lemma have been devised by Elliott Mendelson for his treatment of Gödel's First Incompeteness Theorem. Indeed, that function and lemma are used in Mendelson's book for a complete proof of definability which is not given (but only sehr briefly sketched) in Gödel's incompleteness article.

This was not ccorrect: the β function has been introduiced wirthout its name in Gödel's incomleterness article of 1931. Gödel gaver the function its name in 1934 a talk.

I added the information corresponding references. In my opinion, the issue is resolved.

The article currently claims "the remainder function ... is arithmetically definable", and then follows this up with mention of Robinson Arithmetic (usually denoted "Q"). It's not obvious that ${\displaystyle rem}$ is definable in Q! So at the very least, I think a citation would be in order, or an explanation why 220.244.237.15 (talk) 09:22, 8 May 2022 (UTC)[reply]

Since Robinson arithmetic admits multiplication, my first guess for a definition of rem would be ${\displaystyle z=rem(x,y)\;\;{\stackrel {def}{\Longleftrightarrow }}\;\;(\exists d.z+d=y)\land (\exists q.q\cdot y+z=x)}$. - Jochen Burghardt (talk) 18:02, 9 May 2022 (UTC)[reply]

I made a new section "All primitive recursive functions".

I move the section Elimination of Parameters from there:

https://en.wikipedia.org/wiki/Primitive_recursive_function

To this article here. Jan Burse (talk) 00:12, 29 February 2024 (UTC)[reply]