[1] C. D. Aliprantis and K. Border, Infinite Dimensional Analysis,
Springer-Verlag, Berlin and New York, 1994.
[2] R. J. Aumann, Markets with a continuum of traders, Econometrica 32
(1964), 39-50.
[3] R. J. Aumann, Integrals of set-valued functions, Journal of
Mathematical Analysis and Applications 12 (1965), 1-12.
[4] R. J. Aumann, Existence of competitive equilibria in markets with
a continuum of traders, Econometrica 34 (1966), 1-17.
[5] E. Balder and A. L. Sambucini, Fatou’s lemma for multifunctions
with unbounded values in a dual space, Journal of Convex Analysis 12
(2005), 383-395.
[6] T. F. Bewley, Existence of equilibria with infinitely many
commodities, Journal of Economic Theory 4 (1970), 514-540.
[7] T. F. Bewley, An integration of equilibrium theory and turnpike
theory, Journal of Mathematical Economics 10 (1982), 233-267.
[8] T. F. Bewley, A very weak theorem on the existence of equilibria
in atomless economies with infinitely many commodities, in Equilibrium
Theory in Infinite Dimensional Spaces, M. Ali Khan and N. Yannelis
(Eds), Springer-Verlag, Berlin and New York, 1991.
[9] B. Cornet and J. P. Medecin, Fatou’s lemma for gelfand
integrable mappings, Positivity 6 (2002), 297-315.
[10] G. Debreu, New concepts and techniques for equilibrium analysis,
International Economic Review 3 (1962), 257-273.
[11] J. Diestel and J. J. Uhl, Vector Measures, Mathematical Surveys
and Monographs 15, American Mathematical Society, 1977.
[12] S. Hart and E. Kohlberg, On equally distributed correspondences,
Journal of Mathematical Economics 1 (1974), 167-174.
[13] W. Hildenbrand, Core and Equilibria of a Large Economy, Princeton
University Press, Princeton, New Jersey, 1974.
[14] L. Jones, Existence of equilibria with infinitely many consumers
and infinitely many commodities, Journal of Mathematical Economics 12
(1983), 119-138.
[15] M. Khan, On extensions of the Cournot-Nash theorem, in Advances
in Equilibrium Theory, Lecture Notes in Economics and Mathematical
Systems 244, C. E. Aliprantis et al. (Eds), Springer-Verlag, Berlin
and New York, 1985.
[16] M. Khan and A. Yamazaki, On the cores of economies with
indivisible commodities and a continuum of traders, Journal of
Economic Theory 24 (1981), 218-225.
[17] M. Khan and N. C. Yannelis, Equilibria in markets with a
continuum of agents and commodities, in Equilibrium Theory in Infinite
Dimensional Spaces, M. Ali Khan and N. Yannelis (Eds),
Springer-Verlag, Berlin and New York, 1991.
[18] A. Mas-Colell, A model of equilibrium with differentiated
commodities, Journal of Mathematical Economics 2 (1975), 263-269.
[19] M. Noguchi, Economies with a continuum of consumers, a continuum
of suppliers, and an infinite dimensional commodity space, Journal of
Mathematical Economics 27 (1997a), 1-21.
[20] M. Noguchi, Economies with a continuum of agents with the
commodity -price pairing Journal of Mathematical Economics 28
(1997b), 265-287.
[21] K. Podczeck, Markets with infinitely many commodities and a
continuum of agents with non-convex preferences, Economic Theory 9
(1997), 385-426.
[22] H. W. Royden, Real Analysis, 3-rd Edition, Macmillan, London,
1988.
[23] W. Rudin, Functional Analysis, McGraw-Hill, New York, 1991.
[24] A. Rustichini and N. C. Yannelis, What is perfect competition? in
Equilibrium Theory in Infinite Dimensional Spaces, M. Ali Khan and N.
Yannelis (Eds), Springer-Verlag, Berlin and New York, 1991.
[25] D. Schmeidler, Fatou’s lemma in several dimensions, Proceedings
of American Mathematical Society 24 (1970), 300-306.
[26] T. Suzuki, Intertemporal general equilibrium model with external
increasing returns, Journal of Economic Theory 69 (1996), 117-133.
[27] T. Suzuki, General Equilibrium Analysis of Production and
Increasing Returns, World Scientific, New Jersey and London, 2009.
[28] T. Suzuki, Core and competitive equilibria for a coalitional
exchange economy with infinite time horizon, Journal of Mathematical
Economics 49 (2013a), 234-244.
[29] T. Suzuki, Competitive equilibria of a large exchange economy on
the commodity space Advances in Mathematical Economics 17
(2013b), 121-138.
[30] N. Yannelis, Integration of Banach-valued correspondences, in
Equilibrium Theory in Infinite Dimensional Spaces, M. Ali Khan and N.
Yannelis (Eds), Springer-Verlag, Berlin and New York, 1991a.
[31] N. Yannelis, Set-valued functions of two variables in economic
theory, in Equilibrium Theory in Infinite Dimensional Spaces, M. Ali
Khan and N. Yannelis (Eds), Springer Verlag, Berlin and New York,
1991b.
[32] M. Yano, The turnpike of dynamic general equilibrium paths and
its insensitivity to initial conditions, Journal of Mathematical
Economics 13 (1984), 235-254.
[33] K. Yosida and E. Hewitt, Finitely additive measures,
Transactions of American Mathematical Society 72 (1956), 46-66.