Theorems on the core of an economy with infinitely many commodities and consumers
Please cite this item using this persistent URLhttp://hdl.handle.net/11693/13531
Journal of Mathematical Economics
- Department of Economics 
It is known that the classical theorems of Grodal [Grodal, B., 1972. A second remark on the core of an atomless economy. Economettica 40, 581-583] and Schmeidler [Schmeidler, D., 1972. A remark on the core of an atomless economy. Econometfca 40, 579-580] on the veto power of small coalitions in finite dimensional, atomless economies can be extended (with some minor modifications) to include the case of countably many commodities. This paper presents a further extension of these results to include the case of uncountably many commodities. We also extend Vind's [Vind, K., 1972. A third remark on the core of an atomless economy. Econometrica 40, 585-586] classical theorem on the veto power of big coalitions in finite dimensional, atomless economies to include the case of an arbitrary number of commodities. In smother result, we show that in the coalitional economy defined by an atomless individualistic model, core-Walras equivalence holds even if the commodity space is non-separable. The above-mentioned results are also valid for a differential information economy with a finite state space. We also extend Kannai's [Kannai, Y., 1970. Continuity properties of the core of a market. Econometfca 38, 791-815] theorem on the continuity of the core of a finite dimensional, large economy to include the case of an arbitrary number of commodities. All of our results are applications of a lemma, that we prove here, about the set of aggregate alternatives available to a coalition. Throughout the paper, the commodity space is assumed to be an ordered Banach space which has an interior point in its positive cone. (c) 2008 Elsevier B.V. All rights reserved.
Evren, Ö., & Hüsseinov, F. (2008). Theorems on the core of an economy with infinitely many commodities and consumers. Journal of Mathematical Economics, 44(11), 1180-1196.