Non-Archimedean utility theory

My interest in non-Archimedean utility theory and the problems related to it was aroused by discussions which I have had with Professors Werner Leinfellner and Gunter Menges. On the occasion of the Second Inter national Game Theory Workshop, Berkeley, 1970, which was sponsored by the National Science Foundation, I had the opportunity to report about a result on non-standard utilities. Work on this subject continued when I was a research assistant of Professor Gunter Menges at the Uni versity of Heidelberg. The present mono graph is essentially a translation of my habilitation thesis which was accepted on February 15, 1973 by the Faculty of Economics and Social Sciences at the Universtity of Heidelberg. On translating my thesis I took up some suggestions made by ProfessorWerner Boege from the Faculty of Mathematics at the Uni versity of Heidelberg. Through lack of time many of his ideas have not been taken into consideration but I hope to do so in a future paper. The first chapter should be considered as a short introduction to pref erence orderings and to the notion of a utility theory proposed by Dana Scott and Patrick Suppes. In the second chapter I discuss in some detail various problems of ordinal utility theory. Except when introducing non-standard models of the reals no use is made of concepts of model theory. This is done in deference to those readers who do not wish to be troubled by formal languages and model theory.

I. Preference Orderings and Utility Theory.- 1. Relational Systems.- 2. Preference Relations.- 3. Some Remarks on Utility Theory.- 3.1. On the Formal Notion of Utility Theory.- 4. Linear Inequalities.- 4.1. Theorems of Alternatives.- 4.2. An Application.- II. Ordinal Utility.- 1. Some Classical Representation Theorems.- 2. Lexicographic Utility.- 3. Utility Theories with Respect to n?-Sets.- 4. Ultraproducts and Ultrapowers.- 4.1. Some Definitions and Properties.- 4.2. Introducing Non-Standard Models of the Reals.- 4.3. Ultrapowers of the Reals Over a Countable Index Set.- 4.4. Non-Standard Models of the Rational Numbers which are also n1-Sets.- 5. Approximating an r*-Valued Utility Function by a Real Valued Function.- 6. Non-Standard Utility Functions Always Exist.- 7. Utility Functions for Partial Orderings.- 7.1. Utility Functions in the Wider Sense.- 7.2. Utility Functions in the Narrower Sense.- III. On Numerical Relational Systems.- 1. First-Order Languages.- 2. Some Preliminary Considerations.- 3. Universal and Homogeneous Relational Systems.- 4. Saturated Relational Systems.- 4.1. Some Fundamental Results.- 4.2. Special Relational Systems.- 4.3. Some Special Results for Complete Theories.- 4.4. Ultraproducts and Saturated Relational Systems.- IV. Utility Theories for More Structured Empirical Data.- 1. Some Remarks.- 2. The Empirical Status of Axioms.- 3. Utility Theories which are Axiomatizable in an Ordinary First Order Language.- 3.1. Utility Theories which are Universally Axiomatizable.- 3.2. On Suitable Numerical Relational Systems for Utility Theories which are Axiomatizable by Finitely Many Universal Sentences.- 4. Extensive Utility.- 4.1. Hoelder's Theorem.- 4.2. On the Existence of Real-Valued Utility Functions for Ordered Semigroups.- 4.3. Non-Archimedean Extensive Utility.- 4.3.1. On the Empirical Status of the Axioms of Ordered Abelean Groups and the Existence of Utility Functions.- 4.3.2. The Divisible Ordered Abelean Groups.- 4.3.3. An Application of Robinson's Model Completeness Test.- 5. Conjoint Measurement of Utilities.- 6. On Certain Mean Systems.- 6.1. Archimedean Mean Systems.- 6.2. Non-Archimedean Mean Systems.- V. On Utility Spaces, The Theory of Games and the Realization of Comparative Probability Relations.- 1. A Generalization of the Von Neumann/Morgenstern Utility Theory.- 2. Non-Standard Utilities in Game Theory.- 3. Some Aspects of the Realization of Comparative Probability Relations.- 3.1. Boolean Algebras and Fields of Sets.- 3.2. On the Realization of Some Comparative Probability Relations.- Appendix I. Ordinal and Cardinal Numbers.- Appendix II. Some Basic Facts about Filters and Ultrafilters.- Index of Names.- Index of Subjects.