Matches in DBpedia 2015-10 for { ?s ?p "A Goodman–Nguyen–van Fraassen algebra is a type of conditional event algebra (CEA) that embeds the standard Boolean algebra of unconditional events in a larger algebra which is itself Boolean. The goal (as with all CEAs) is to equate the conditional probability P(A ∩ B) / P(A) with the probability of a conditional event, P(A → B) for more than just trivial choices of A, B, and P."@en }
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- Goodman–Nguyen–van_Fraassen_algebra abstract "A Goodman–Nguyen–van Fraassen algebra is a type of conditional event algebra (CEA) that embeds the standard Boolean algebra of unconditional events in a larger algebra which is itself Boolean. The goal (as with all CEAs) is to equate the conditional probability P(A ∩ B) / P(A) with the probability of a conditional event, P(A → B) for more than just trivial choices of A, B, and P.".
- Goodman–Nguyen–van_Fraassen_algebra comment "A Goodman–Nguyen–van Fraassen algebra is a type of conditional event algebra (CEA) that embeds the standard Boolean algebra of unconditional events in a larger algebra which is itself Boolean. The goal (as with all CEAs) is to equate the conditional probability P(A ∩ B) / P(A) with the probability of a conditional event, P(A → B) for more than just trivial choices of A, B, and P.".