C. Aliprantis and K. Border, Infinite Dimensional Analysis, 1994.

C. Aliprantis and D. Brown, Equilibria in markets with a Riesz space of commodities, Journal of Mathematical Economics. Elsevier, vol.11, pp.189-207, 1983.

C. Aliprantis, D. Florenzano, and R. Tourky, Production equilibria, Journal of Mathematical Economics. Elsevier, vol.42, pp.406-421, 2006.
URL : https://hal.archives-ouvertes.fr/halshs-00092809

T. F. Bewley, Existence of equilibria in economies with infinitely many commodities, Journal of Economic Theory, vol.4, pp.514-540, 1972.

J. M. Bonnisseau, Existence of equilibria in economies with externalities and nonconvexities, Set Valued Analysis. Springer, vol.5, pp.209-226, 1997.
URL : https://hal.archives-ouvertes.fr/hal-00176205

J. M. Bonnisseau, The marginal pricing rule in economies with infinitely many commodities, Positivity. Springer, vol.6, pp.275-296, 2002.

J. M. Bonnisseau and B. Cornet, Existence of equilibria when firms follow bounded losses pricing rules, Journal of Mathematical Economics, vol.17, pp.119-147, 1988.
URL : https://hal.archives-ouvertes.fr/hal-00187223

, Documents de travail du Centre d'Economie de la Sorbonne

J. M. Bonnisseau and B. Cornet, Existence of marginal cost pricing equilibria in an economy with several nonconvex firms, Econometrica, vol.58, pp.661-682, 1990.

J. M. Bonnisseau and B. Cornet, Existence of marginal cost pricing equilibria: the nonsmooth case, International Economic Review, vol.31, pp.685-708, 1990.
URL : https://hal.archives-ouvertes.fr/hal-00623271

J. M. Bonnisseau and M. Meddeb, Existence of equilibria in economies with increasing returns and infinitely many commodities, Journal of Mathematical Economics. Elsevier, vol.31, pp.287-307, 1999.
URL : https://hal.archives-ouvertes.fr/hal-00187220

J. M. Bonnisseau and J. P. Médecin, Existence of marginal pricing equilibria in economies with externalities and non-convexities, Journal of Mathematical Economics, vol.36, pp.271-294, 2001.
URL : https://hal.archives-ouvertes.fr/hal-00187219

F. Clarke, Optimization and nonsmooth analysis, Canadian Mathematical Society Series of Monographs and Advanced Texts, 1983.

B. Cornet, Existence of equilibria in economies with increasing returns, Contributions to Operations Research and Economics: The XXth Anniversary of CORE, pp.79-97, 1990.

M. Florenzano and . Marakulin, Production equilibria in vector lattices, Economic Theory, vol.17, pp.577-598, 2001.

M. Fuentes, Existence of equilibria in economies with externalities and non-convexities in an infinite dimensional commodity space, Journal of Mathematical Economics, vol.47, pp.768-776, 2011.

M. Fuentes, Marginal pricing and marginal cost pricing in economies with externalities and infinitely many commodities, Trends in Mathematical Economics, pp.123-146, 2016.

R. Guesnerie, Pareto Optimality in Non-Convex Economies, Econometrica, vol.43, pp.1-29, 1975.

H. Hotelling, The general welfare in relation to problems of taxation and of railway and utility rates, Econometrica, vol.6, pp.242-269, 1938.

C. F. Huang and D. Kreps, On intertemporal preferences with a continuous time dimension: an exploratory study, 1987.

L. Jones, A competitive model of commodity differentiation, Econometrica, vol.52, pp.507-530, 1984.

, Documents de travail du Centre d'Economie de la Sorbonne

H. Keiding, Topological vector spaces admissible in economic equilibrium theory, Journal of Mathematical Analysis and Applications. Elsevier, vol.351, pp.675-681, 2009.

A. Mas-colell, A model of equilibrium with differentiated commodities, Journal of Mathematical Economics, vol.2, pp.263-295, 1975.

A. Mas-colell, Valuation equilibrium and Pareto optimum revisited, Advances in Mathematical Economics, 1986.

A. Mas-colell, The price equilibrium existence problem in topological vector lattices, Econometrica, vol.54, pp.1039-1054, 1986.

A. Mas-colell and S. Richards, A new approach to the existence of equilibria in vector lattices, Journal of Economic Theory, vol.53, pp.1-11, 1991.

J. Médecin and . Ph, Morse´s lemma with parameter. Cahier Eco-Math, 1998.

K. Podczeck, Equilibria in vector lattices without ordered preferences or uniform properness, Journal of Mathematical Economics. Elsevier, vol.25, pp.465-485, 1996.

S. Richard, A new approach to production equilibria in vector lattices, Journal of Mathematical Economics, vol.18, pp.41-56, 1989.

H. H. Schaefer and M. P. Wolf, Topological Vector Spaces, 1999.

C. Shannon, Increasing returns in infinite-horizon economies, Review of Economic Studies, vol.64, pp.73-96, 1996.

N. Yannelis and W. Zame, Equilibria in Banach lattices without ordered preferences, Journal of Mathematical Economics. Elsevier, vol.15, pp.85-110, 1986.

W. Zame, Competitive equilibria in production economies with an infinite dimensional commodity space, Econometrica, vol.55, pp.1075-1108, 1987.