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The Average Transition Complexity of Glushkov and Partial Derivative Automata

Title
The Average Transition Complexity of Glushkov and Partial Derivative Automata
Type
Article in International Conference Proceedings Book
Year
2011
Authors
Broda, S
(Author)
FCUP
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Machiavelo, A
(Author)
FCUP
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Moreira, N
(Author)
FCUP
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Reis, R
(Author)
FCUP
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Conference proceedings International
Pages: 93-104
15th International Conference on Developments in Language Theory, DLT 2011
Milan, 19 July 2011 through 22 July 2011
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Publicação em ISI Proceedings ISI Proceedings
Publicação em ISI Web of Knowledge ISI Web of Knowledge
Other information
Authenticus ID: P-007-ZE0
Abstract (EN): In this paper, the relation between the Glushkov automaton ( ) and the partial derivative automaton ( ) of a given regular expression, in terms of transition complexity, is studied. The average transition complexity of was proved by Nicaud to be linear in the size of the corresponding expression. This result was obtained using an upper bound of the number of transitions of . Here we present a new quadratic construction of that leads to a more elegant and straightforward implementation, and that allows the exact counting of the number of transitions. Based on that, a better estimation of the average size is presented. Asymptotically, and as the alphabet size grows, the number of transitions per state is on average 2. Broda et al. computed an upper bound for the ratio of the number of states of to the number of states of , which is about for large alphabet sizes. Here we show how to obtain an upper bound for the number of transitions in , which we then use to get an average case approximation. Some experimental results are presented that illustrate the quality of our estimate. © 2011 Springer-Verlag.
Language: English
Type (Professor's evaluation): Scientific
No. of pages: 12
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