Values of non-atomic vector measure games

被引：0

作者：

Abraham Neyman

机构：

[1] The Hebrew University of Jerusalem,Institute of Mathematics and Center for Rationality

[2] Givat Ram,undefined

来源：

Israel Journal of Mathematics | 2001年 / 124卷

关键词：

Characteristic Function; Bounded Variation; Vector Measure; Cauchy Distribution; Market Game;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

There is a value (of norm one) on the closed space of games that is generated by all games of bounded variationf o μ, whereμ is a vector of non-atomic probability measures andf is continuous at 0=μ(ø) and atμ(I).

引用

页码：1 / 27

页数：26

共 12 条

[1] Dvoretzky A.(1951)Relations among certain ranges of vector measures Pacific Journal of Mathematics 1 59-74
[2] Wald A.(1980)Measure-based values of market games Mathematics of Operations Research 5 192-228
[3] Wolfowitz J.(1988)Values of vector measure games: Are they linear combinations of the measures? Journal of Mathematical Economics 17 31-40
[4] Hart S.(1940)Sur les fonctions-vecteurs completement additives Bulletin of the Academy of Sciences of the USSR, Mathematics Series 4 465-478
[5] Hart S.(1988)The Shapley value in the non-differentiable case International Journal of Game Theory 17 1-65
[6] Neyman A.(1977)Continuous values are diagonal Mathematics of Operations Research 2 338-342
[7] Lyapunov A.(1988)Weighted majority games have asymptotic value Mathematics of Operations Research 13 556-580
[8] Mertens J.-F.(1976)The existence of nondiagonal axiomatic values Mathematics of Operations Research 1 246-250
[9] Neyman A.(undefined)undefined undefined undefined undefined-undefined
[10] Neyman A.(undefined)undefined undefined undefined undefined-undefined

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