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1. Verfasser: Carl, Merlin
Format: Preprint
Veröffentlicht: 2021
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Online-Zugang:https://arxiv.org/abs/2102.13531
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author Carl, Merlin
author_facet Carl, Merlin
contents This paper extends our paper \cite{C2} for the conference ``Computability in Europe'' 2022. After Infinite Time Turing Machines (ITTM) were introduced in Hamkins and Lewis \cite{HL}, a number of machine models of computability have been generalized to the transfinite, along with various variants thereof. While for some of these models the computational strength has been successfully determined, there are still several white spots on the map of transfinite computability. In this paper, we contribute to the understanding of the computational strength of transfinite machine models by (i) proving lower bounds on the computational strength of $α$-Infinite Time Register Machines ($α$-ITRMs) for certain values of $α$, refuting a conjecture about their strength made in \cite{alpha itrms}, (ii) showing that the computational strength of cardinal-recognizing ITRMs is equal to that of ITRMs and (iii) showing that non-solvability of the bounded halting problem, existence of a universal machine and an increase of computational power by allowing machines to recognize cardinals are equivalent for $α$-ITRMs for all relevant values of $α$ .
format Preprint
id arxiv_https___arxiv_org_abs_2102_13531
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Lower bounds on $β(α)$ and other properties of $α$-ITRMs
Carl, Merlin
Logic
This paper extends our paper \cite{C2} for the conference ``Computability in Europe'' 2022. After Infinite Time Turing Machines (ITTM) were introduced in Hamkins and Lewis \cite{HL}, a number of machine models of computability have been generalized to the transfinite, along with various variants thereof. While for some of these models the computational strength has been successfully determined, there are still several white spots on the map of transfinite computability. In this paper, we contribute to the understanding of the computational strength of transfinite machine models by (i) proving lower bounds on the computational strength of $α$-Infinite Time Register Machines ($α$-ITRMs) for certain values of $α$, refuting a conjecture about their strength made in \cite{alpha itrms}, (ii) showing that the computational strength of cardinal-recognizing ITRMs is equal to that of ITRMs and (iii) showing that non-solvability of the bounded halting problem, existence of a universal machine and an increase of computational power by allowing machines to recognize cardinals are equivalent for $α$-ITRMs for all relevant values of $α$ .
title Lower bounds on $β(α)$ and other properties of $α$-ITRMs
topic Logic
url https://arxiv.org/abs/2102.13531