First versionInternational audienceWe prove that the maximum speed and the entropy of a one-tape Turing machine are computable, in the sense that we can approximate them to any given precision $\epsilon$. This is contrary to popular belief, as all dynamical properties are usually undecidable for Turing machines. The result is quite specific to one-tape Turing machines, as it is not true anymore for two-tape Turing machines by the results of Blondel et al., and uses the approach of crossing sequences introduced by Hennie
AbstractA Turing machine with two storage tapes cannot simulate a queue in both real-time and with a...
International audienceIt is well known that one-tape Turing machines running in linear time are no m...
AbstractIn 1985, Dymond and Tompa showed that every deterministic Turing machine with linear tapes a...
AbstractWe shall show that, for each nondeterministic single-tape Turing machine M of time complexit...
The model of Turing machines has been studied since its birth in 1936. Researchers have continuously...
A computation of a single tape Turing machine can be simulated by a probabilistic random access mach...
AbstractThis paper studies the classification of recursive sets by the number of tape reversals requ...
Let L be a language recognized by a nondeterministic (single-tape) Turing machine of time complexity...
AbstractFor off-line one-tape Turing machines the number of tape reversals required for various comp...
Sources that generate symbolic sequences with algorithmic nature may differ in statistical complexit...
It is shown that for any real constants b>a≥0, multitape Turing machines operating in space L1(n)=[b...
AbstractWe show that if the number of available states is fixed and is sufficiently large, then one-...
Aucune descriptionVarious hard problems in computer science are related to the asymptotical runtime ...
It is well-known that one-tape Turing machines working in linear time are no more powerful than fini...
Several classes of multihead and auxiliary stack automata are introduced and are used to characteriz...
AbstractA Turing machine with two storage tapes cannot simulate a queue in both real-time and with a...
International audienceIt is well known that one-tape Turing machines running in linear time are no m...
AbstractIn 1985, Dymond and Tompa showed that every deterministic Turing machine with linear tapes a...
AbstractWe shall show that, for each nondeterministic single-tape Turing machine M of time complexit...
The model of Turing machines has been studied since its birth in 1936. Researchers have continuously...
A computation of a single tape Turing machine can be simulated by a probabilistic random access mach...
AbstractThis paper studies the classification of recursive sets by the number of tape reversals requ...
Let L be a language recognized by a nondeterministic (single-tape) Turing machine of time complexity...
AbstractFor off-line one-tape Turing machines the number of tape reversals required for various comp...
Sources that generate symbolic sequences with algorithmic nature may differ in statistical complexit...
It is shown that for any real constants b>a≥0, multitape Turing machines operating in space L1(n)=[b...
AbstractWe show that if the number of available states is fixed and is sufficiently large, then one-...
Aucune descriptionVarious hard problems in computer science are related to the asymptotical runtime ...
It is well-known that one-tape Turing machines working in linear time are no more powerful than fini...
Several classes of multihead and auxiliary stack automata are introduced and are used to characteriz...
AbstractA Turing machine with two storage tapes cannot simulate a queue in both real-time and with a...
International audienceIt is well known that one-tape Turing machines running in linear time are no m...
AbstractIn 1985, Dymond and Tompa showed that every deterministic Turing machine with linear tapes a...