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150325s1987 xx |||||o 00| ||eng c |
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|a (DE-627)JST063692627
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|a (JST)171223
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|a DE-627
|b ger
|c DE-627
|e rakwb
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|a eng
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|a 096 skew-symmetric bilinear preferences
|2 MSC
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|a 857 SSB theory in decision analysis
|2 MSC
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|a Lavalle, Irving H.
|e verfasserin
|4 aut
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|a Decision Analysis under States-Additive SSB Preferences
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|c 1987
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|a Text
|b txt
|2 rdacontent
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|a Computermedien
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|a Online-Ressource
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|a We survey Fishburn's skew-symmetric bilinear (SSB) theory of risky choice under nonlinear and potentially nontransitive preferences and apply the states-additive special case in the context of decision analysis, showing that tractable characterizations of optimal choices are obtainable via linear programming once the decision has been expressed in normal (i.e., tabular) form. If preferences are transitive, they are also linear and representable by von Neumann-Morgenstern utility, in which case optimal choices may be obtained by the familiar recursion analysis of the extensive (i.e., tree) form.
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|a Copyright 1987 The Operations Research Society of America
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|a Behavioral sciences
|x Psychology
|x Cognitive psychology
|x Cognitive processes
|x Decision making
|x Decision analysis
|x Decision trees
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4 |
|a Behavioral sciences
|x Psychology
|x Cognitive psychology
|x Cognitive processes
|x Decision making
|x Decision analysis
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650 |
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4 |
|a Mathematics
|x Applied mathematics
|x Game theory
|x Strategic behavior
|x Randomized strategies
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650 |
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4 |
|a Behavioral sciences
|x Psychology
|x Applied psychology
|x Consumer psychology
|x Rational choice theory
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650 |
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|a Mathematics
|x Applied mathematics
|x Game theory
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650 |
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4 |
|a Applied sciences
|x Computer science
|x Computer programming
|x Mathematical programming
|x Linear programming
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|a Mathematics
|x Applied mathematics
|x Statistics
|x Applied statistics
|x Descriptive statistics
|x Statistical sampling
|x Random allocation
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|
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|a Behavioral sciences
|x Psychology
|x Cognitive psychology
|x Decision theory
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|a Mathematics
|x Pure mathematics
|x Probability theory
|x Probabilities
|x Conditional probabilities
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|a Mathematics
|x Pure mathematics
|x Algebra
|x Mathematical transitivity
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|a research-article
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|a Fishburn, Peter C.
|e verfasserin
|4 aut
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|i Enthalten in
|t Operations Research
|d Institute for Operations Research and the Management Sciences, 1956
|g 35(1987), 5, Seite 722-735
|w (DE-627)320595005
|w (DE-600)2019440-7
|x 15265463
|7 nnns
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|g volume:35
|g year:1987
|g number:5
|g pages:722-735
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|u https://www.jstor.org/stable/171223
|3 Volltext
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|d 35
|j 1987
|e 5
|h 722-735
|