767 research outputs found
Possibilistic Uncertainty Handling for Answer Set Programming
In this work, we introduce a new framework able to deal with a reasoning that is at the same time non monotonic and uncertain. In order to take into account a certainty level associated to each piece of knowledge, we use possibility theory to extend the non monotonic semantics of stable models for logic programs with default negation. By means of a possibility distribution we define a clear semantics of such programs by introducing what is a possibilistic stable model. We also propose a syntactic process based on a fix-point operator to compute these particular models representing the deductions of the program and their certainty. Then, we show how this introduction of a certainty level on each rule of a program can be used in order to restore its consistency in case of the program has no model at all. Furthermore, we explain how we can compute possibilistic stable models by using available softwares for Answer Set Programming and we describe the main lines of the system that we have developed to achieve this goal
Towards the implementation of a preference-and uncertain-aware solver using answer set programming
Logic programs with possibilistic ordered disjunction (or LPPODs) are a recently defined logic-programming framework based on logic programs with ordered disjunction and possibilistic logic. The framework inherits the properties of such formalisms and merging them, it supports a reasoning which is nonmonotonic, preference-and uncertain-aware. The LPPODs syntax allows to specify 1) preferences in a qualitative way, and 2) necessity values about the certainty of program clauses. As a result at semantic level, preferences and necessity values can be used to specify an order among program solutions. This class of program therefore fits well in the representation of decision problems where a best option has to be chosen taking into account both preferences and necessity measures about information. In this paper we study the computation and the complexity of the LPPODs semantics and we describe the algorithm for its implementation following on Answer Set Programming approach. We describe some decision scenarios where the solver can be used to choose the best solutions by checking whether an outcome is possibilistically preferred over another considering preferences and uncertainty at the same time.Postprint (published version
The PITA System: Tabling and Answer Subsumption for Reasoning under Uncertainty
Many real world domains require the representation of a measure of
uncertainty. The most common such representation is probability, and the
combination of probability with logic programs has given rise to the field of
Probabilistic Logic Programming (PLP), leading to languages such as the
Independent Choice Logic, Logic Programs with Annotated Disjunctions (LPADs),
Problog, PRISM and others. These languages share a similar distribution
semantics, and methods have been devised to translate programs between these
languages. The complexity of computing the probability of queries to these
general PLP programs is very high due to the need to combine the probabilities
of explanations that may not be exclusive. As one alternative, the PRISM system
reduces the complexity of query answering by restricting the form of programs
it can evaluate. As an entirely different alternative, Possibilistic Logic
Programs adopt a simpler metric of uncertainty than probability. Each of these
approaches -- general PLP, restricted PLP, and Possibilistic Logic Programming
-- can be useful in different domains depending on the form of uncertainty to
be represented, on the form of programs needed to model problems, and on the
scale of the problems to be solved. In this paper, we show how the PITA system,
which originally supported the general PLP language of LPADs, can also
efficiently support restricted PLP and Possibilistic Logic Programs. PITA
relies on tabling with answer subsumption and consists of a transformation
along with an API for library functions that interface with answer subsumption
Towards possibilistic fuzzy answer set programming
Fuzzy answer set programming (FASP) is a generalization of answer set programming to continuous domains. As it can not readily take uncertainty into account, however, FASP is not suitable as a basis for approximate reasoning and cannot easily be used to derive conclusions from imprecise information. To cope with this, we propose an extension of FASP based on possibility theory. The resulting framework allows us to reason about uncertain information in continuous domains, and thus also about information that is imprecise or vague. We propose a syntactic procedure, based on an immediate consequence operator, and provide a characterization in terms of minimal models, which allows us to straightforwardly implement our framework using existing FASP solvers
The Role of preferences in logic programming: nonmonotonic reasoning, user preferences, decision under uncertainty
Intelligent systems that assist users in fulfilling complex tasks need a concise and processable representation of incomplete and
uncertain information. In order to be able to choose among different options, these systems also need a compact and processable
representation of the concept of preference.
Preferences can provide an effective way to choose the best solutions to a given problem. These solutions can represent the most
plausible states of the world when we model incomplete information, the most satisfactory states of the world when we express
user preferences, or optimal decisions when we make decisions under uncertainty.
Several domains, such as, reasoning under incomplete and uncertain information, user preference modeling, and qualitative
decision making under uncertainty, have benefited from advances on preference representation. In the literature, several symbolic
approaches of nonclassical reasoning have been proposed. Among them, logic programming under answer set semantics offers a
good compromise between symbolic representation and computation of knowledge and several extensions for handling
preferences.
Nevertheless, there are still some open issues to be considered in logic programming. In nonmonotonic reasoning, first, most
approaches assume that exceptions to logic program rules are already specified. However, sometimes, it is possible to consider
implicit preferences based on the specificity of the rules to handle incomplete information. Secondly, the joint handling of
exceptions and uncertainty has received little attention: when information is uncertain, the selection of default rules can be a matter
of explicit preferences and uncertainty. In user preference modeling, although existing logic programming specifications allow to
express user preferences which depend both on incomplete and contextual information, in some applications, some preferences in
some context may be more important than others. Furthermore, more complex preference expressions need to be supported. In
qualitative decision making under uncertainty, existing logic programming-based methodologies for making decisions seem to lack
a satisfactory handling of preferences and uncertainty.
The aim of this dissertation is twofold: 1) to tackle the role played by preferences in logic programming from different perspectives,
and 2) to contribute to this novel field by proposing several frameworks and methods able to address the above issues. To this
end, we will first show how preferences can be used to select default rules in logic programs in an implicit and explicit way. In
particular, we propose (i) a method for selecting logic program rules based on specificity, and (ii) a framework for selecting
uncertain default rules based on explicit preferences and the certainty of the rules. Then, we will see how user preferences can be
modeled and processed in terms of a logic program (iii) in order to manage user profiles in a context-aware system and (iv) in order
to propose a framework for the specification of nested (non-flat) preference expressions. Finally, in the attempt to bridge the gap
between logic programming and qualitative decision under uncertainty, (v) we propose a classical- and a possibilistic-based logic
programming methodology to compute an optimal decision when uncertainty and preferences are matters of degrees.Els sistemes intel.ligents que assisteixen a usuaris en la realització de tasques complexes necessiten
una representació concisa i formal de la informació que permeti un raonament nomonòton
en condicions d’incertesa. Per a poder escollir entre les diferents opcions, aquests
sistemes solen necessitar una representació del concepte de preferència.
Les preferències poden proporcionar una manera efectiva de triar entre les millors solucions
a un problema. Aquestes solucions poden representar els estats del món més plausibles
quan es tracta de modelar informació incompleta, els estats del món més satisfactori
quan expressem preferències de l’usuari, o decisions òptimes quan estem parlant de presa
de decisió incorporant incertesa.
L’ús de les preferències ha beneficiat diferents dominis, com, el raonament en presència
d’informació incompleta i incerta, el modelat de preferències d’usuari, i la presa de decisió
sota incertesa. En la literatura, s’hi troben diferents aproximacions al raonament no clà ssic
basades en una representació simbòlica de la informació. Entre elles, l’enfocament de programació
lògica, utilitzant la semà ntica de answer set, ofereix una bona aproximació entre
representació i processament simbòlic del coneixement, i diferents extensions per gestionar
les preferències.
No obstant això, en programació lògica es poden identificar diferents problemes pel
que fa a la gestió de les preferències. Per exemple, en la majoria d’enfocaments de raonament
no-monòton s’assumeix que les excepcions a default rules d’un programa lògic ja
estan expressades. Però de vegades es poden considerar preferències implÃcites basades en
l’especificitat de les regles per gestionar la informació incompleta. A més, quan la informació
és també incerta, la selecció de default rules pot dependre de preferències explÃcites i de la
incertesa. En el modelatge de preferències del usuari, encara que els formalismes existents
basats en programació lògica permetin expressar preferències que depenen d’informació
contextual i incompleta, en algunes aplicacions, donat un context, algunes preferències
poden ser més importants que unes altres. Per tant, resulta d’interès un llenguatge que
permeti capturar preferències més complexes. En la presa de decisions sota incertesa, les
metodologies basades en programació lògica creades fins ara no ofereixen una solució del
tot satisfactòria pel que fa a la gestió de les preferències i la incertesa.
L’objectiu d’aquesta tesi és doble: 1) estudiar el paper de les preferències en la programació
lògica des de diferents perspectives, i 2) contribuir a aquesta jove à rea d’investigació
proposant diferents marcs teòrics i mètodes per abordar els problemes anteriorment citats.
Per a aquest propòsit veurem com les preferències es poden utilitzar de manera implÃcita i
explÃcita per a la selecció de default rules proposant: (i) un mètode basat en l’especificitat
de les regles, que permeti seleccionar regles en un programa lògic; (ii) un marc teòric per a
la selecció de default rules incertes basat en preferències explÃcites i la incertesa de les regles.
També veurem com les preferències de l’usuari poden ser modelades i processades usant
un enfocament de programació lògica (iii) que suporti la creació d’un mecanisme de gestió
dels perfils dels usuaris en un sistema amb reconeixement del context; (iv) que permeti
proposar un marc teòric capaç d’expressar preferències amb fòrmules imbricades. Per últim,
amb l’objectiu de disminuir la distà ncia entre programació lògica i la presa de decisió
amb incertesa proposem (v) una metodologia basada en programació lògica clà ssica i en
una extensió de la programació lògica que incorpora lògica possibilÃstica per modelar un
problema de presa de decisions i per inferir una decisió òptima.Los sistemas inteligentes que asisten a usuarios en tareas complejas necesitan una representación
concisa y procesable de la información que permita un razonamiento nomonótono
e incierto. Para poder escoger entre las diferentes opciones, estos sistemas suelen
necesitar una representación del concepto de preferencia.
Las preferencias pueden proporcionar una manera efectiva para elegir entre las mejores
soluciones a un problema. Dichas soluciones pueden representar los estados del mundo
más plausibles cuando hablamos de representación de información incompleta, los estados
del mundo más satisfactorios cuando hablamos de preferencias del usuario, o decisiones
óptimas cuando estamos hablando de toma de decisión con incertidumbre.
El uso de las preferencias ha beneficiado diferentes dominios, como, razonamiento en
presencia de información incompleta e incierta, modelado de preferencias de usuario, y
toma de decisión con incertidumbre. En la literatura, distintos enfoques simbólicos de razonamiento
no clásico han sido creados. Entre ellos, la programación lógica con la semántica
de answer set ofrece un buen acercamiento entre representación y procesamiento simbólico
del conocimiento, y diferentes extensiones para manejar las preferencias.
Sin embargo, en programación lógica se pueden identificar diferentes problemas con
respecto al manejo de las preferencias. Por ejemplo, en la mayorÃa de enfoques de razonamiento
no-monótono se asume que las excepciones a default rules de un programa lógico
ya están expresadas. Pero, a veces se pueden considerar preferencias implÃcitas basadas en
la especificidad de las reglas para manejar la información incompleta. Además, cuando la
información es también incierta, la selección de default rules pueden depender de preferencias
explÃcitas y de la incertidumbre. En el modelado de preferencias, aunque los formalismos
existentes basados en programación lógica permitan expresar preferencias que
dependen de información contextual e incompleta, in algunas aplicaciones, algunas preferencias
en un contexto puede ser más importantes que otras. Por lo tanto, un lenguaje
que permita capturar preferencias más complejas es deseable. En la toma de decisiones con
incertidumbre, las metodologÃas basadas en programación lógica creadas hasta ahora no
ofrecen una solución del todo satisfactoria al manejo de las preferencias y la incertidumbre.
El objectivo de esta tesis es doble: 1) estudiar el rol de las preferencias en programación
lógica desde diferentes perspectivas, y 2) contribuir a esta joven área de investigación proponiendo
diferentes marcos teóricos y métodos para abordar los problemas anteriormente
citados. Para este propósito veremos como las preferencias pueden ser usadas de manera implÃcita y explÃcita para la selección de default rules proponiendo: (i) un método para
seleccionar reglas en un programa basado en la especificad de las reglas; (ii) un marco
teórico para la selección de default rules basado en preferencias explÃcitas y incertidumbre.
También veremos como las preferencias del usuario pueden ser modeladas y procesadas
usando un enfoque de programación lógica (iii) para crear un mecanismo de manejo de
los perfiles de los usuarios en un sistema con reconocimiento del contexto; (iv) para crear
un marco teórico capaz de expresar preferencias con formulas anidadas. Por último, con
el objetivo de disminuir la distancia entre programación lógica y la toma de decisión con
incertidumbre proponemos (v) una metodologÃa para modelar un problema de toma de
decisiones y para inferir una decisión óptima usando un enfoque de programación lógica
clásica y uno de programación lógica extendida con lógica posibilÃstica.Sistemi intelligenti, destinati a fornire supporto agli utenti in processi decisionali complessi,
richiedono una rappresentazione dell’informazione concisa, formale e che permetta
di ragionare in maniera non monotona e incerta. Per poter scegliere tra le diverse opzioni,
tali sistemi hanno bisogno di disporre di una rappresentazione del concetto di preferenza
altrettanto concisa e formale.
Le preferenze offrono una maniera efficace per scegliere le miglior soluzioni di un problema.
Tali soluzioni possono rappresentare gli stati del mondo più credibili quando si tratta
di ragionamento non monotono, gli stati del mondo più soddisfacenti quando si tratta delle
preferenze degli utenti, o le decisioni migliori quando prendiamo una decisione in condizioni
di incertezza.
Diversi domini come ad esempio il ragionamento non monotono e incerto, la strutturazione
del profilo utente, e i modelli di decisione in condizioni d’incertezza hanno tratto
beneficio dalla rappresentazione delle preferenze. Nella bibliografia disponibile si possono
incontrare diversi approcci simbolici al ragionamento non classico. Tra questi, la programmazione
logica con answer set semantics offre un buon compromesso tra rappresentazione
simbolica e processamento dell’informazione, e diversi estensioni per la gestione delle preferenze
sono state proposti in tal senso.
Nonostante ció, nella programmazione logica esistono ancora delle problematiche aperte.
Prima di tutto, nella maggior parte degli approcci al ragionamento non monotono, si suppone
che nel programma le eccezioni alle regole siano già specificate. Tuttavia, a volte per
trattare l’informazione incompleta è possibile prendere in considerazione preferenze implicite
basate sulla specificità delle regole. In secondo luogo, la gestione congiunta di eccezioni
e incertezza ha avuto scarsa attenzione: quando l’informazione è incerta, la scelta
di default rule può essere una questione di preferenze esplicite e d’incertezza allo stesso
tempo. Nella creazione di preferenze dell’utente, anche se le specifiche di programmazione
logica esistenti permettono di esprimere preferenze che dipendono sia da un’informazione
incompleta che da una contestuale, in alcune applicazioni talune preferenze possono essere
più importanti di altre, o espressioni più complesse devono essere supportate. In un processo
decisionale con incertezza, le metodologie basate sulla programmazione logica viste
sinora, non offrono una gestione soddisfacente delle preferenze e dell’incertezza.
Lo scopo di questa dissertazione è doppio: 1) chiarire il ruolo che le preferenze giocano
nella programmazione logica da diverse prospettive e 2) contribuire proponendo in questo nuovo settore di ricerca, diversi framework e metodi in grado di affrontare le citate
problematiche. Per prima cosa, dimostreremo come le preferenze possono essere usate per
selezionare default rule in un programma in maniera implicita ed esplicita. In particolare
proporremo: (i) un metodo per la selezione delle regole di un programma logico basato
sulla specificità dell’informazione; (ii) un framework per la selezione di default rule basato
sulle preferenze esplicite e sull’incertezza associata alle regole del programma. Poi, vedremo
come le preferenze degli utenti possono essere modellate attraverso un programma
logico, (iii) per creare il profilo dell’utente in un sistema context-aware, e (iv) per proporre
un framework che supporti la definizione di preferenze complesse. Infine, per colmare le
lacune in programmazione logica applicata a un processo di decisione con incertezza (v)
proporremo una metodologia basata sulla programmazione logica classica e una metodologia
basata su un’estensione della programmazione logica con logica possibilistica
Characterizing and Extending Answer Set Semantics using Possibility Theory
Answer Set Programming (ASP) is a popular framework for modeling
combinatorial problems. However, ASP cannot easily be used for reasoning about
uncertain information. Possibilistic ASP (PASP) is an extension of ASP that
combines possibilistic logic and ASP. In PASP a weight is associated with each
rule, where this weight is interpreted as the certainty with which the
conclusion can be established when the body is known to hold. As such, it
allows us to model and reason about uncertain information in an intuitive way.
In this paper we present new semantics for PASP, in which rules are interpreted
as constraints on possibility distributions. Special models of these
constraints are then identified as possibilistic answer sets. In addition,
since ASP is a special case of PASP in which all the rules are entirely
certain, we obtain a new characterization of ASP in terms of constraints on
possibility distributions. This allows us to uncover a new form of disjunction,
called weak disjunction, that has not been previously considered in the
literature. In addition to introducing and motivating the semantics of weak
disjunction, we also pinpoint its computational complexity. In particular,
while the complexity of most reasoning tasks coincides with standard
disjunctive ASP, we find that brave reasoning for programs with weak
disjunctions is easier.Comment: 39 pages and 16 pages appendix with proofs. This article has been
accepted for publication in Theory and Practice of Logic Programming,
Copyright Cambridge University Pres
Possibilistic answer set programming revisited
Possibilistic answer set programming (PASP) extends answer set programming (ASP) by attaching to each rule a degree of certainty. While such an extension is important from an application point of view, existing semantics are not well-motivated, and do not always yield intuitive results. To develop a more suitable semantics, we first introduce a characterization of answer sets of classical ASP programs in terms of possibilistic logic where an ASP program specifies a set of constraints on possibility distributions. This characterization is then naturally generalized to define answer sets of PASP programs. We furthermore provide a syntactic counterpart, leading to a possibilistic generalization of the well-known Gelfond-Lifschitz reduct, and we show how our framework can readily be implemented using standard ASP solvers
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