论文信息 - Expected utility from additive utility on semigroups

Expected utility from additive utility on semigroups

In the present paper we study the framework of additive utility theory, obtaining new results derived from a concurrence of algebraic and topological techniques. Such techniques lean on the concept of a connected topological totally ordered semigroup. We achieve a general result concerning the existence of continuous and additive utility functions on completely preordered sets endowed with a binary operation ``+'', not necessarily being commutative or associative. In the final part of the paper we get some applications to expected utility theory, and a representation theorem for a class of complete preorders on a quite general family of real mixture spaces.

[1] J. Leeuw,et al. Abstract Measurement Theory. , 1986 .

[2] Aloisio Araujo,et al. Lack of Pareto Optimal Allocations in Economies with Infinitely Many Commodities: The Need for Impatience , 1985 .

[3] Â. Einy. On preference relations which satisfy weak independence property , 1989 .

[4] Juan Carlos Candeal-Haro,et al. A note on linear utility , 1995 .

[5] J. Milnor,et al. AN AXIOMATIC APPROACH TO MEASURABLE UTILITY , 1953 .

[6] Juan Carlos Candeal,et al. Topological Additively Representable Semigroups , 1997 .

[7] Juan Carlos Candeal,et al. Archimedeaness and additive utility on totally ordered semigroups , 1996 .

[8] Existence of a utility on a topological semigroup , 1976 .

[9] Zsolt Páles,et al. The associativity equation revisited , 1989 .

[10] Donald J. Brown,et al. Myopic Economic Agents , 1981 .

[11] Jaap Van Brakel,et al. Foundations of measurement , 1983 .

[12] Walter Trockel,et al. Continuous linear representability of binary relations , 1995 .