6533b7d1fe1ef96bd125c1f9
RESEARCH PRODUCT
Probabilistic inferences from conjoined to iterated conditionals
David E. OverAngelo GilioGiuseppe SanfilippoNiki Pfeifersubject
Indicative conditionalCounterfactual conditionalSettore MAT/06 - Probabilita' E Statistica MatematicaCompound conditionalInference02 engineering and technology050105 experimental psychologyTheoretical Computer ScienceArtificial Intelligence0202 electrical engineering electronic engineering information engineeringFOS: Mathematics0501 psychology and cognitive sciencesEvent (probability theory)Discrete mathematicsApplied Mathematics05 social sciencesProbability (math.PR)Probabilistic logicConditional probabilityCoherence (philosophical gambling strategy)Mathematics - Logic03b48 60A99Settore MAT/01 - Logica MatematicaLogical biconditionalCenteringp-EntailmentIterated conditional020201 artificial intelligence & image processingCounterfactualLogic (math.LO)CoherenceSoftwareMathematics - Probabilitydescription
Abstract There is wide support in logic, philosophy, and psychology for the hypothesis that the probability of the indicative conditional of natural language, P ( if A then B ) , is the conditional probability of B given A, P ( B | A ) . We identify a conditional which is such that P ( if A then B ) = P ( B | A ) with de Finetti's conditional event, B | A . An objection to making this identification in the past was that it appeared unclear how to form compounds and iterations of conditional events. In this paper, we illustrate how to overcome this objection with a probabilistic analysis, based on coherence, of these compounds and iterations. We interpret the compounds and iterations as conditional random quantities which, given some logical dependencies, may reduce to conditional events. We show how the inference to B | A from A and B can be extended to compounds and iterations of both conditional events and biconditional events. Moreover, we determine the respective uncertainty propagation rules. Finally, we make some comments on extending our analysis to counterfactuals.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2017-01-25 |