Your search keyword '"Edgeworth equilibrium"' showing total 3 results

1. Production equilibria

Author

Charalambos Aliprantis, Monique Florenzano, Rabee Tourky, Depatment of Economics, Purdue University, Purdue University [West Lafayette], Centre d'économie de la Sorbonne (CES), and Université Paris 1 Panthéon-Sorbonne (UP1)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Edgeworth equilibrium, Economics and Econometrics, Equilibrium, Applied Mathematics, Riesz-Kantorovich functional, 05 social sciences, Production economies, Properness, Sup-convolution, [SHS.ECO]Humanities and Social Sciences/Economics and Finance, [MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA], Production economies,Equilibrium,Edgeworth equilibrium,Properness,Riesz-Kantorovich functional,Sup-convolution, 0502 economics and business, 050207 economics, 050205 econometrics

Abstract

A first version of this paper has been presented at the 11th Conference on Real Analysis and Measure Theory in Ischia (Italy, 2004). This version was presented at the Debreu Memorial Conference in Berkeley (USA, 2005); International audience; This paper studies production economies in a commodity space that is an ordered locally convex space. We establish a general theorem on the existence of equilibrium without requiring that the commodity space or its dual be a vector lattice. Such commodity spaces arise in models of portfolio trading where the absence of some option usually means the absence of a vector lattice structure. The conditions on preferences and production sets are at least as general as those imposed in the literature dealing with vector lattice commodity spaces. The main assumption on the order structure is that the Riesz-Kantorovich functionals satisfy a uniform properness condition that can be formulated in terms of a duality property that is readily checked. This condition is satisfied in a vector lattice commodity space but there are many examples of other commodity spaces that satisfy the condition, which are not vector lattices, have no order unit, and do not have either the decomposition property or its approximate versions.

Published

2006

2. Equilibrium analysis in financial markets with countably many securities

Author

Monique Florenzano, Victor-Filipe Martins-Da-Rocha, Rabee Tourky, Charalambos D. Aliprantis, Department of Economics, Purdue University [West Lafayette], CEntre de Recherche en Mathématiques, Statistique et Économie Mathématique (CERMSEM), Université Paris 1 Panthéon-Sorbonne (UP1)-Centre National de la Recherche Scientifique (CNRS), CEntre de REcherches en MAthématiques de la DEcision (CEREMADE), Centre National de la Recherche Scientifique (CNRS)-Université Paris Dauphine-PSL, and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)

Subjects

Economics and Econometrics, Riesz-Kantorovich functional, 0211 other engineering and technologies, 02 engineering and technology, Space (mathematics), [MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA], inductive limit topology, Non-trivial quasi-equilibrium, Securities markets, Edgeworth equilibrium, F-cone, 0502 economics and business, Dominance order, Economics, Countable set, 050205 econometrics, 021103 operations research, Applied Mathematics, 05 social sciences, Financial market, Regular polygon, [SHS.ECO]Humanities and Social Sciences/Economics and Finance, Cone (topology), Securities markets,Edgeworth equilibrium,Non-trivial quasi-equilibrium,inductive limit topology,F-cone,Riesz-Kantorovich functional, Portfolio, Convex cone, Mathematical economics

Abstract

International audience; An F-cone is a pointed and generating convex cone of a real vector space that is the union of a countable family of finite dimensional polyedral convex cones such that each of which is an extremel subset of the subsequent one. In this paper, we study securities markets with countably many securities and arbitrary finite portfolio holdings. Moreover, we assume that each investor is constrained to have a non-negative end-of-period wealth. If, under the portfolio dominance order, the positive cone of the portfolio space is an F-cone, then Edgeworth allocations and non-trivial quasi-equilibria exist. This result extend the case where, as in Aliprantis et al.[JME 30 (1998a) 347-366], the positive cone is a Yudin cone.

Published

2004

3. General equilibrium analysis in ordered topological vector spaces

Author

Charalambos D. Aliprantis, Monique Florenzano, Rabee Tourky, Department of Economics, Purdue University [West Lafayette], CEntre de Recherche en Mathématiques, Statistique et Économie Mathématique (CERMSEM), and Université Paris 1 Panthéon-Sorbonne (UP1)-Centre National de la Recherche Scientifique (CNRS)

Subjects

TheoryofComputation_MISCELLANEOUS, Economics and Econometrics, Sequential equilibrium, Pareto-optimum, Computer Science::Computer Science and Game Theory, General equilibrium theory, Equilibrium, ordered topological vector spaces, Properness, Monotonic function, [MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA], 01 natural sciences, Equilibrium,Valuation equilibrium,Pareto-optimum,Edgeworth equilibrium,Properness,ordered topological vector spaces,Riesz-Kantorovich formula,sup-convolution, Valuation equilibrium, Edgeworth equilibrium, Riesz-Kantorovich formula, sup-convolution, 0502 economics and business, 0101 mathematics, 050205 econometrics, Mathematics, Transitive relation, Applied Mathematics, 010102 general mathematics, 05 social sciences, TheoryofComputation_GENERAL, [SHS.ECO]Humanities and Social Sciences/Economics and Finance, Pareto optimal, 8. Economic growth, Mathematical economics, Vector space

Abstract

The second welfare theorem and the core-equivalence theorem have been proved to be fundamental tools for obtaining equilibrium existence theorems, especially in an infinite dimensional setting. For well-behaved exchange economies that we call proper economies, this paper gives (minimal) conditions for supporting with prices Pareto optimal allocations and decentralizing Edgeworth equilibrium allocations as non-trivial equilibria. As we assume neither transitivity nor monotonicity on the preferences of consumers, most of the existing equilibrium existence results are a consequence of our results. A natural application is in Finance, where our conditions lead to new equilibrium existence results, and also explain why some financial economies fail to have equilibrium., Résumé. Le second théorème de l'économie du bien-être et le théorème d'équivalence coeur-équilibre sont des outils fondamentaux pour obtenir des théorèmes d'existence de l'équilibre, spécialement quand l'espace des biens n'est pas de dimension finie. Pour des économies d'échange que nous appelons propres, cet articles donne des conditions (minimales) de décentralisation par des prix des allocations Pareto-optimales et des équilibres d'Edgeworth. Comme nous ne supposons ni transitivité, ni monotonicité des préférences des consommateurs, la plupart des théorèmes existants d'existance de l'équilibre sont une conséquence de nos résultats. Une appication naturelle de ces résultats est en Finance où nos conditions conduisent à des résultats nouveaux, en même temps qu'elles expliquent pourquoi certains modèles financiers n'ont pas d'équilibre.

Published

2004