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ICALP
2010
Springer

Probabilistic Automata on Finite Words: Decidable and Undecidable Problems

14 years 5 months ago
Probabilistic Automata on Finite Words: Decidable and Undecidable Problems
Abstract. This paper tackles three algorithmic problems for probabilistic automata on finite words: the Emptiness Problem, the Isolation Problem and the Value 1 Problem. The Emptiness Problem asks, given some probability 0 ≤ λ ≤ 1, whether there exists a word accepted with probability greater than λ, and the Isolation Problem asks whether there exist words whose acceptance probability is arbitrarily close to λ. Both these problems are known to be undecidable [11, 4, 3]. About the Emptiness problem, we provide a new simple undecidability proof and prove that it is undecidable for automata with as few as two probabilistic transitions. The Value 1 Problem is the special case of the Isolation Problem when λ = 1 or λ = 0. The decidability of the Value 1 Problem was an open question. We show that the Value 1 Problem is undecidable. Moreover, we introduce a new class of probabilistic automata, ♯-acyclic automata, for which the Value 1 Problem is decidable.
Hugo Gimbert, Youssouf Oualhadj
Added 19 Jul 2010
Updated 19 Jul 2010
Type Conference
Year 2010
Where ICALP
Authors Hugo Gimbert, Youssouf Oualhadj
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