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| lrdepaper = http://www.lrde.epita.fr/dload/papers/demaille.16.ciaa.pdf |
| lrdepaper = http://www.lrde.epita.fr/dload/papers/demaille.16.ciaa.pdf |
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| lrdereport = http://www.lrde.epita.fr/dload/papers/demaille.16.ciaa.report.pdf |
| lrdereport = http://www.lrde.epita.fr/dload/papers/demaille.16.ciaa.report.pdf |
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| type = inproceedings |
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| id = demaille.16.ciaa |
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Revision as of 17:28, 25 November 2016
- Authors
- Akim Demaille
- Where
- Proceedings of Implementation and Application of Automata21st International Conference (CIAA'16)
- Place
- Seoul, South Korea
- Type
- inproceedings
- Publisher
- Springer
- Projects
- Vcsn
- Date
- 2016-04-26
Abstract
We introduce (weighted) rational expressions to denote series over Cartesian products of monoids. To this endwe propose the operator to build multitape expressions such as Failed to parse (syntax error): {\displaystyle (a^+∣x + b^+∣y)^*} . We define expansions, which generalize the concept of derivative of a rational expression, but relieved from the need of a free monoid. We propose an algorithm based on expansions to build multitape automata from multitape expressions.
Documents
Bibtex (lrde.bib)
@InProceedings{ demaille.16.ciaa,
author = {Akim Demaille},
title = {Derived-Term Automata of Multitape Rational Expressions},
booktitle = {Proceedings of Implementation and Application of Automata,
21st International Conference (CIAA'16)},
editor = {Yo-Sub Han and Kai Salomaa},
year = 2016,
publisher = {Springer},
address = {Seoul, South Korea},
pages = {51--63},
isbn = {978-3-319-40946-7},
doi = {10.1007/978-3-319-40946-7_5},
anurl = {http://dx.doi.org/10.1007/978-3-319-40946-7_5},
series = {Lecture Notes in Computer Science},
volume = 9705,
month = jul,
abstract = {We introduce (weighted) rational expressions to denote
series over Cartesian products of monoids. To this end, we
propose the operator $\mid$ to build multitape expressions
such as $(a^+\mid x + b^+\mid y)^*$. We define expansions,
which generalize the concept of derivative of a rational
expression, but relieved from the need of a free monoid. We
propose an algorithm based on expansions to build multitape
automata from multitape expressions.}
}