Set-Valued Conditioning in a Possibility Theory Setting

Possibilistic logic is a well-known framework for dealing with uncertainty and reasoning under inconsistent or prioritized knowledge bases. This paper deals with conditioning uncertain information where the weights associated with formulas are in the form of sets of uncertainty degrees. The first part of the paper studies set-valued possibility theory where we provide a characterization of set-valued possibilistic logic bases and set-valued possibility distributions by means of the concepts of compatible possibilistic logic bases and compatible possibility distributions respectively. The second part of the paper addresses conditioning set-valued possibility distributions. We first propose a set of three natural postulates for conditioning set-valued possibility distributions. We then show that any set-valued conditioning satisfying these three postulates is necessarily based on conditioning the set of compatible standard possibility distributions. The last part of the paper shows how one can efficiently compute set-valued conditioning over possibilistic knowledge bases.

[1]  Giulianella Coletti,et al.  Coherent T-conditional Possibility Envelopes and Nonmonotonic Reasoning , 2014, IPMU.

[2]  Didier Dubois,et al.  Generalized Possibilistic Logic , 2011, SUM.

[3]  Pascale Fonck,et al.  A comparative study of possibilistic conditional independence and lack of interaction , 1997, Int. J. Approx. Reason..

[4]  Fabio Gagliardi Cozman,et al.  Credal networks , 2000, Artif. Intell..

[5]  Julien Hué,et al.  Interval-Based Possibilistic Logic , 2011, IJCAI.

[6]  E. Hisdal Conditional possibilities independence and noninteraction , 1978 .

[7]  Vladik Kreinovich,et al.  Compatible-Based Conditioning in Interval-Based Possibilistic Logic , 2015, IJCAI.

[8]  Didier Dubois,et al.  Bayesian conditioning in possibility theory , 1997, Fuzzy Sets Syst..

[9]  J. Lang Possibilistic Logic: Complexity and Algorithms , 2000 .

[10]  I. Levi,et al.  The Enterprise of Knowledge: An Essay on Knowledge, Credal Probability, and Chance , 1983 .

[11]  Giulianella Coletti,et al.  Finitely maxitive conditional possibilities, Bayesian-like inference, disintegrability and conglomerability , 2016, Fuzzy Sets Syst..

[12]  Anton Wallner Extreme points of coherent probabilities in finite spaces , 2007, Int. J. Approx. Reason..

[13]  Lluis Godo,et al.  Extending possibilistic logic over Gödel logic , 2011, Int. J. Approx. Reason..

[14]  Didier Dubois,et al.  Multiple agent possibilistic logic , 2013, J. Appl. Non Class. Logics.

[15]  Didier Dubois,et al.  Possibility Theory and its Applications: a Retrospective and Prospective view , 2006, Decision Theory and Multi-Agent Planning.

[16]  Tuan-Fang Fan,et al.  A Logic for Reasoning about Justified Uncertain Beliefs , 2015, IJCAI.

[17]  Didier Dubois,et al.  The logical view of conditioning and its application to possibility and evidence theories , 1990, Int. J. Approx. Reason..

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

[19]  Steven Schockaert,et al.  Stable Models in Generalized Possibilistic Logic , 2012, KR.

[20]  Didier Dubois,et al.  Symbolic Possibilistic Logic: Completeness and Inference Methods , 2015, ECSQARU.

[21]  Didier Dubois,et al.  Timed possibilistic logic , 1991, Fundam. Informaticae.

[22]  Robert L. Wolpert,et al.  Statistical Inference , 2019, Encyclopedia of Social Network Analysis and Mining.

[23]  Henri Prade,et al.  Encoding formulas with partially constrained weights in a possibilistic-like many-sorted propositional logic , 2005, IJCAI.

[24]  Didier Dubois,et al.  Possibility Theory and Its Applications: Where Do We Stand? , 2015, Handbook of Computational Intelligence.

[25]  Martine De Cock,et al.  Multilateral Negotiation in Boolean Games with Incomplete Information Using Generalized Possibilistic Logic , 2015, IJCAI.

[26]  Giulianella Coletti,et al.  Finitely maxitive T-conditional possibility theory: Coherence and extension , 2016, Int. J. Approx. Reason..

[27]  Didier Dubois,et al.  On various ways of tackling incomplete information in statistics , 2014, Int. J. Approx. Reason..