Bounding resource consumption with Gödel-Dummett logics
Identifieur interne :
000485 ( PascalFrancis/Corpus );
précédent :
000484;
suivant :
000486
Bounding resource consumption with Gödel-Dummett logics
Auteurs : Dominique Larchey-WendlingSource :
-
Lecture notes in computer science [ 0302-9743 ] ; 2005.
RBID : Pascal:06-0063204
Descripteurs français
- Pascal (Inist)
- Intelligence artificielle,
Non déterminisme,
Système non déterministe,
Sémantique opérationnelle,
Modèle Kripke,
Approche probabiliste,
Algèbre processus,
Processus linéaire,
Transformation linéaire,
Modélisation,
Logique intermédiaire.
English descriptors
- KwdEn :
- Artificial intelligence,
Intermediate logic,
Kripke model,
Linear process,
Linear transformation,
Modeling,
Non determinism,
Non deterministic system,
Operational semantics,
Probabilistic approach,
Process algebra.
Abstract
Gödel-Dummett logic LC and its finite approximations LCn are the intermediate logics complete w.r.t. linearly ordered Kripke models. In this paper, we use LCn logics as a tool to bound resource consumption in some process calculi. We introduce a non-deterministic process calculus where the consumption of a particular resource denoted ● is explicit and provide an operational semantics which measures the consumption of this resource. We present a linear transformation of a process P into a formula f of LC. We show that the consumption of the resource by P can be bounded by the positive integer n if and only if the formula f admits a counter-model in LCn. Combining this result with our previous results on proof and counter-model construction for LCn, we conclude that bounding resource consumption is (linearly) equivalent to searching counter-models in LCn.
Notice en format standard (ISO 2709)
Pour connaître la documentation sur le format Inist Standard.
pA |
A01 | 01 | 1 | | @0 0302-9743 |
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A05 | | | | @2 3835 |
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A09 | 01 | 1 | ENG | @1 Logic for programming, artificial intelligence, and reasoning : 12th international conference, LPAR 2005, Montego Bay, Jamaica, December 2-6, 2005 : Proceedings |
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A11 | 01 | 1 | | @1 LARCHEY-WENDLING (Dominique) |
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A14 | 01 | | | @1 LORIA - CNRS, Campus scientifique, BP 239 @2 54 506 Vandœuvre-lès-Nancy @3 FRA @Z 1 aut. |
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A20 | | | | @1 682-696 |
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A21 | | | | @1 2005 |
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A23 | 01 | | | @0 ENG |
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A26 | 01 | | | @0 3-540-30553-X |
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A44 | | | | @0 0000 @1 © 2006 INIST-CNRS. All rights reserved. |
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A45 | | | | @0 13 ref. |
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A47 | 01 | 1 | | @0 06-0063204 |
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A60 | | | | @1 P @2 C |
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A61 | | | | @0 A |
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A64 | 01 | 1 | | @0 Lecture notes in computer science |
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A66 | 01 | | | @0 DEU |
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C01 | 01 | | ENG | @0 Gödel-Dummett logic LC and its finite approximations LCn are the intermediate logics complete w.r.t. linearly ordered Kripke models. In this paper, we use LCn logics as a tool to bound resource consumption in some process calculi. We introduce a non-deterministic process calculus where the consumption of a particular resource denoted ● is explicit and provide an operational semantics which measures the consumption of this resource. We present a linear transformation of a process P into a formula f of LC. We show that the consumption of the resource by P can be bounded by the positive integer n if and only if the formula f admits a counter-model in LCn. Combining this result with our previous results on proof and counter-model construction for LCn, we conclude that bounding resource consumption is (linearly) equivalent to searching counter-models in LCn. |
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C02 | 01 | X | | @0 001D02C |
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C02 | 02 | X | | @0 001D02A04 |
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C03 | 01 | X | FRE | @0 Intelligence artificielle @5 01 |
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C03 | 01 | X | ENG | @0 Artificial intelligence @5 01 |
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C03 | 01 | X | SPA | @0 Inteligencia artificial @5 01 |
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C03 | 02 | X | FRE | @0 Non déterminisme @5 06 |
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C03 | 02 | X | ENG | @0 Non determinism @5 06 |
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C03 | 02 | X | SPA | @0 No determinismo @5 06 |
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C03 | 03 | X | FRE | @0 Système non déterministe @5 07 |
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C03 | 03 | X | ENG | @0 Non deterministic system @5 07 |
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C03 | 03 | X | SPA | @0 Sistema no determinista @5 07 |
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C03 | 04 | X | FRE | @0 Sémantique opérationnelle @5 08 |
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C03 | 04 | X | ENG | @0 Operational semantics @5 08 |
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C03 | 04 | X | SPA | @0 Semantica operacional @5 08 |
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C03 | 05 | X | FRE | @0 Modèle Kripke @5 23 |
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C03 | 05 | X | ENG | @0 Kripke model @5 23 |
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C03 | 05 | X | SPA | @0 Modelo Kripke @5 23 |
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C03 | 06 | X | FRE | @0 Approche probabiliste @5 24 |
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C03 | 06 | X | ENG | @0 Probabilistic approach @5 24 |
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C03 | 06 | X | SPA | @0 Enfoque probabilista @5 24 |
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C03 | 07 | X | FRE | @0 Algèbre processus @5 25 |
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C03 | 07 | X | ENG | @0 Process algebra @5 25 |
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C03 | 07 | X | SPA | @0 Algebra proceso @5 25 |
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C03 | 08 | X | FRE | @0 Processus linéaire @5 26 |
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C03 | 08 | X | ENG | @0 Linear process @5 26 |
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C03 | 08 | X | SPA | @0 Proceso lineal @5 26 |
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C03 | 09 | X | FRE | @0 Transformation linéaire @5 27 |
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C03 | 09 | X | ENG | @0 Linear transformation @5 27 |
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C03 | 09 | X | SPA | @0 Transformación lineal @5 27 |
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C03 | 10 | X | FRE | @0 Modélisation @5 28 |
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C03 | 10 | X | ENG | @0 Modeling @5 28 |
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C03 | 10 | X | SPA | @0 Modelización @5 28 |
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C03 | 11 | X | FRE | @0 Logique intermédiaire @4 CD @5 96 |
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C03 | 11 | X | ENG | @0 Intermediate logic @4 CD @5 96 |
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C03 | 11 | X | SPA | @0 Lógica intermediaria @4 CD @5 96 |
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pR |
A30 | 01 | 1 | ENG | @1 Logic for programming, artificial intelligence, and reasoning. International conference @2 12 @3 Montego Bay JAM @4 2005-12-02 |
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|
Format Inist (serveur)
NO : | PASCAL 06-0063204 INIST |
ET : | Bounding resource consumption with Gödel-Dummett logics |
AU : | LARCHEY-WENDLING (Dominique) |
AF : | LORIA - CNRS, Campus scientifique, BP 239/54 506 Vandœuvre-lès-Nancy/France (1 aut.) |
DT : | Publication en série; Congrès; Niveau analytique |
SO : | Lecture notes in computer science; ISSN 0302-9743; Allemagne; Da. 2005; Vol. 3835; Pp. 682-696; Bibl. 13 ref. |
LA : | Anglais |
EA : | Gödel-Dummett logic LC and its finite approximations LCn are the intermediate logics complete w.r.t. linearly ordered Kripke models. In this paper, we use LCn logics as a tool to bound resource consumption in some process calculi. We introduce a non-deterministic process calculus where the consumption of a particular resource denoted ● is explicit and provide an operational semantics which measures the consumption of this resource. We present a linear transformation of a process P into a formula f of LC. We show that the consumption of the resource by P can be bounded by the positive integer n if and only if the formula f admits a counter-model in LCn. Combining this result with our previous results on proof and counter-model construction for LCn, we conclude that bounding resource consumption is (linearly) equivalent to searching counter-models in LCn. |
CC : | 001D02C; 001D02A04 |
FD : | Intelligence artificielle; Non déterminisme; Système non déterministe; Sémantique opérationnelle; Modèle Kripke; Approche probabiliste; Algèbre processus; Processus linéaire; Transformation linéaire; Modélisation; Logique intermédiaire |
ED : | Artificial intelligence; Non determinism; Non deterministic system; Operational semantics; Kripke model; Probabilistic approach; Process algebra; Linear process; Linear transformation; Modeling; Intermediate logic |
SD : | Inteligencia artificial; No determinismo; Sistema no determinista; Semantica operacional; Modelo Kripke; Enfoque probabilista; Algebra proceso; Proceso lineal; Transformación lineal; Modelización; Lógica intermediaria |
LO : | INIST-16343.354000138672300460 |
ID : | 06-0063204 |
Links to Exploration step
Pascal:06-0063204
Le document en format XML
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logics as a tool to bound resource consumption in some process calculi. We introduce a non-deterministic process calculus where the consumption of a particular resource denoted ● is explicit and provide an operational semantics which measures the consumption of this resource. We present a linear transformation of a process P into a formula f of LC. We show that the consumption of the resource by P can be bounded by the positive integer n if and only if the formula f admits a counter-model in LC<sub>n</sub>
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<server><NO>PASCAL 06-0063204 INIST</NO>
<ET>Bounding resource consumption with Gödel-Dummett logics</ET>
<AU>LARCHEY-WENDLING (Dominique)</AU>
<AF>LORIA - CNRS, Campus scientifique, BP 239/54 506 Vandœuvre-lès-Nancy/France (1 aut.)</AF>
<DT>Publication en série; Congrès; Niveau analytique</DT>
<SO>Lecture notes in computer science; ISSN 0302-9743; Allemagne; Da. 2005; Vol. 3835; Pp. 682-696; Bibl. 13 ref.</SO>
<LA>Anglais</LA>
<EA>Gödel-Dummett logic LC and its finite approximations LC<sub>n</sub>
are the intermediate logics complete w.r.t. linearly ordered Kripke models. In this paper, we use LC<sub>n</sub>
logics as a tool to bound resource consumption in some process calculi. We introduce a non-deterministic process calculus where the consumption of a particular resource denoted ● is explicit and provide an operational semantics which measures the consumption of this resource. We present a linear transformation of a process P into a formula f of LC. We show that the consumption of the resource by P can be bounded by the positive integer n if and only if the formula f admits a counter-model in LC<sub>n</sub>
. Combining this result with our previous results on proof and counter-model construction for LC<sub>n</sub>
, we conclude that bounding resource consumption is (linearly) equivalent to searching counter-models in LC<sub>n</sub>
.</EA>
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<ED>Artificial intelligence; Non determinism; Non deterministic system; Operational semantics; Kripke model; Probabilistic approach; Process algebra; Linear process; Linear transformation; Modeling; Intermediate logic</ED>
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