Preference Modeling with Possibilistic Networks and Symbolic Weights: A Theoretical Study

The use of possibilistic networks for representing conditional preference statements on discrete variables has been proposed only recently. The approach uses non-instantiated possibility weights to define conditional preference tables. Moreover, additional information about the relative strengths of these symbolic weights can be taken into account. The fact that at best we have some information about the relative values of these weights acknowledges the qualitative nature of preference specification. These conditional preference tables give birth to vectors of symbolic weights that reflect the preferences that are satisfied and those that are violated in a considered situation. The comparison of such vectors may rely on different orderings: the ones induced by the product-based, or the minimum-based chain rule underlying the possibilistic network, the discrimin, or leximin refinements of the minimum-based ordering, as well as Pareto ordering, and the symmetric Pareto ordering that refines it. A thorough study of the relations between these orderings in presence of vector components that are symbolic rather numerical is presented. In particular, we establish that the product-based ordering and the symmetric Pareto ordering coincide in presence of constraints comparing pairs of symbolic weights. This ordering agrees in the Boolean case with the inclusion between the sets of preference statements that are violated. The symmetric Pareto ordering may be itself refined by the leximin ordering. The paper highlights the merits of product-based possibilistic networks for representing preferences and provides a comparative discussion with CP-nets and OCF-networks.

[1]  Didier Dubois,et al.  Possibilistic logic : a retrospective and prospective view , 2003 .

[2]  Gabriele Kern-Isberner,et al.  Using inductive reasoning for completing OCF-networks , 2015, J. Appl. Log..

[3]  Didier Dubois,et al.  Approximation of Conditional Preferences Networks fiCP-netsfl in Possibilistic Logic , 2006, 2006 IEEE International Conference on Fuzzy Systems.

[4]  Didier Dubois,et al.  Conditional Preference-Nets, Possibilistic Logic, and the Transitivity of Priorities , 2013, SGAI Conf..

[5]  Wolfgang Spohn,et al.  Ordinal Conditional Functions: A Dynamic Theory of Epistemic States , 1988 .

[6]  Bruno Zanuttini,et al.  Learning conditional preference networks , 2010, Artif. Intell..

[7]  Didier Dubois,et al.  Possibilistic Conditional Preference Networks , 2015, ECSQARU.

[8]  Ronen I. Brafman,et al.  Preference‐Based Constrained Optimization with CP‐Nets , 2004, Comput. Intell..

[9]  Didier Dubois,et al.  Ordres Partiels entre Sous-Ensembles d'un Ensemble Partiellement Ordonné , 2014 .

[10]  L. Zadeh Fuzzy sets as a basis for a theory of possibility , 1999 .

[11]  Patrice Perny,et al.  Réseaux GAI pour la prise de décision , 2007, Rev. d'Intelligence Artif..

[12]  Khaled Mellouli,et al.  Anytime propagation algorithm for min-based possibilistic graphs , 2003, Soft Comput..

[13]  Luc De Raedt,et al.  Statistical Relational Artificial Intelligence: Logic, Probability, and Computation , 2016, Statistical Relational Artificial Intelligence.

[14]  Judea Pearl,et al.  Qualitative Probabilities for Default Reasoning, Belief Revision, and Causal Modeling , 1996, Artif. Intell..

[15]  Arie Tzvieli Possibility theory: An approach to computerized processing of uncertainty , 1990, J. Am. Soc. Inf. Sci..

[16]  Patrice Perny,et al.  GAI Networks for Decision Making under Certainty , 2005, IJCAI 2005.

[17]  Didier Dubois,et al.  Possibilistic Networks: A New Setting for Modeling Preferences , 2014, SUM.

[18]  Jérôme Lang,et al.  The Complexity of Learning Separable ceteris paribus Preferences , 2009, IJCAI.

[19]  Didier Dubois,et al.  Refinements of the maximin approach to decision-making in a fuzzy environment , 1996, Fuzzy Sets Syst..

[20]  Gabriele Kern-Isberner,et al.  CP- and OCF-networks - a comparison , 2016, Fuzzy Sets Syst..

[21]  Ronen I. Brafman,et al.  CP-nets: A Tool for Representing and Reasoning withConditional Ceteris Paribus Preference Statements , 2011, J. Artif. Intell. Res..

[22]  Didier Dubois,et al.  On the transformation between possibilistic logic bases and possibilistic causal networks , 2002, Int. J. Approx. Reason..

[23]  Christoph Beierle,et al.  Computational Models of Rationality, Essays dedicated to Gabriele Kern-Isberner on the occasion of her 60th birthday , 2016, Computational Models of Rationality.

[24]  Patrice Perny,et al.  GAI Networks for Utility Elicitation , 2004, KR.

[25]  Didier Dubois,et al.  Epistemic Entrenchment and Possibilistic Logic , 1991, Artif. Intell..