A Philosophical Foundation of Non-Additive Measure and Probability

In this paper, non-additivity of a set function is interpreted as a method to express relations between sets which are not modeled in a set theoretic way. Drawing upon a concept called “quasi-analysis” of the philosopher Rudolf Carnap, we introduce a transform for sets, functions, and set functions to formalize this idea. Any image-set under this transform can be interpreted as a class of (quasi-)components or (quasi-)properties representing the original set. We show that non-additive set functions can be represented as signed σ-additive measures defined on sets of quasi-components. We then use this interpretation to justify the use of non-additive set functions in various applications like for instance multi criteria decision making and cooperative game theory. Additionally, we show exemplarily by means of independence, conditioning, and products how concepts from classical measure and probability theory can be transfered to the non-additive theory via the transform.

[1]  Gleb A. Koshevoy,et al.  Distributive Lattices and Products of Capacities , 1998 .

[2]  Itzhak Gilboa,et al.  Canonical Representation of Set Functions , 1995, Math. Oper. Res..

[3]  Dieter Denneberg Conditioning (updating) non-additive measures , 1994, Ann. Oper. Res..

[4]  Alain Chateauneuf,et al.  Some Characterizations of Lower Probabilities and Other Monotone Capacities through the use of Möbius Inversion , 1989, Classic Works of the Dempster-Shafer Theory of Belief Functions.

[5]  Hans Jørgen Jacobsen,et al.  The product of capacities and belief functions , 1996 .

[6]  M. Sugeno,et al.  A theory of fuzzy measures: Representations, the Choquet integral, and null sets , 1991 .

[7]  I. Gilboa,et al.  Maxmin Expected Utility with Non-Unique Prior , 1989 .

[8]  M. Grabisch Fuzzy integral in multicriteria decision making , 1995 .

[9]  G. Choquet Theory of capacities , 1954 .

[10]  Dieter Denneberg,et al.  Representation of the Choquet integral with the 6-additive Möbius transform , 1997, Fuzzy Sets Syst..

[11]  Massimo Marinacci Decomposition and Representation of Coalitional Games , 1996, Math. Oper. Res..

[12]  Dieter Denneberg Totally monotone core and products of monotone measures , 2000, Int. J. Approx. Reason..

[13]  R. Carnap Der logische Aufbau der Welt , 1998 .

[14]  M. Grabisch The application of fuzzy integrals in multicriteria decision making , 1996 .

[15]  T. Fine,et al.  Towards a Frequentist Theory of Upper and Lower Probability , 1982 .

[16]  Dieter Denneberg,et al.  Conditional expectation for monotone measures, the discrete case , 2002 .

[17]  M. Sugeno,et al.  An interpretation of fuzzy measures and the Choquet integral as an integral with respect to a fuzzy , 1989 .

[18]  Glenn Shafer,et al.  A Mathematical Theory of Evidence , 2020, A Mathematical Theory of Evidence.