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MSS
2015
IEEE
2015
IEEE
Continuity, completeness, betweenness and cone-monotonicity
A non-trivial, transitive and reflexive binary relation on the set of lotteries satisfying independence that also satisfies any two of the following three axioms satisfies the third: completeness, Archimedean and mixture continuity (Dubra (2011)). This paper generalizes Dubra’s result in two ways: First, by replacing independence with a weaker betweenness axiom. Second, by replacing independence with a weaker cone-monotonicity axiom. The latter is related to betweenness and, in the case in which outcomes correspond to real numbers, implies monotonicity with respect to first-order stochastic dominance. . .
Real-time Traffic| Added | 15 Apr 2016 |
| Updated | 15 Apr 2016 |
| Type | Journal |
| Year | 2015 |
| Where | MSS |
| Authors | Edi Karni, Zvi Safra |
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