2.3. CONCEPTOS BÁSICOS DEL SOFTWARE DE SIMULACIÓN ARENA
2.3.2. INTRODUCCIÓN AL EXCEL
References
Aho, A., Hopcroft, J., and Ullman, J., (1983): “Data structures and algorithms,” Addison-Wesley, Reading, MA.
Arrow, K.J., (1951): “An extension of the basic theorems of classi cal welfare economics,” in J. Neyman (ed.), Proceedings o f the Second
Berkeley Symposium on Mathematical Statistics and Probability. Uni
versity of California Press, pp.507-532.
Arrow, K.J., and Debreu, G., (1954): “Existence o f an equilibrium for a competitive economy,” Econometrica, 22, 265-290.
Arrow, K.J., and Hahn, F., (1971): General Competitive Analysis. Holden-Day, San Francisco.
Balasko, Y., Cass, D., and Shell, K., (1980): “Existence o f Competitive Equilibrium in a General Overlapping Generations Model,” Journal o f
Economic Theory, 23, 307-322.
Balasko, Y., Cass, D., and Siconolfi, P., (1990): “The structure of financial equilibrium with exogenous yields,” Journal o f Mathematical
Economics, 19, 195-216.
Barnett, S., (1990): “Matrices, methods and applications,” Clarendon Press, Oxford.
Burke, J., (1988): “On the Existence of Price Equilibria in Dynamic Economies,” Journal o f Economic Theory, 44, 281-300.
Busacker, R.G. and Saaty, T.L., (1965): “Finite graphs and networks: an introduction with applications,” McGraw-Hill.
Cass, D., Siconolfi, P., and Villanacci, A., (2001): “Generic regular ity o f competitive equilibria with restricted participation,” Journal of
IRREDUCIBILITY IN EXCHANGE ECONOMIES 133 Debreu, G.,(1956):“Market equilibrium," Proceedings o f the National
Academy of Sciences, 42, 876-878.
Debreu, G.,(1959): Theory o f Value. John Wiley and Sons.
Debreu, G.,(1962): “New Concepts and Techniques for Equilibrium Analysis,” International Economic Review, 3, 257-273.
Eaves, B.C., (1985): “Finite solution o f pure trade markets with Cobb- Douglas utilities,” Mathematical Programming Study, 23, 226-239. Gale, D., (1955): “The law of supply and demand,” Mathematica Scan
dinavian, 3, 155-169.
Geanakoplos, J.D., and Polemarchakis, H.M., (1986): “Existence, reg ularity, and constrained suboptimality of competitive allocations when markets are complete,” in Uncertainty, Information and Communica
tion. Essays in honour o f Kenneth Arrow, (W.P. Heller, R.M. Ross, and
D.A. Starrett, Eds.), Vol. 3. Cambridge University Press, Cambridge, U.K.
Geanakoplos, J.D., and Polemarchakis, H.M., (1991): “Overlapping Generations” , in Handbook o f Mathematical Economics, Volume IV, Edited by W. Hildenbrand and H. Sonnenschein. Elsevier Science Pub lishers.
Gottardi, P., and Hens, T., (1996): “The Survival Assumption and Ex istence of Competitive Equilibria When Asset Markets are Incomplete,”
Journal of Economic Theory, 71, 313-323.
Green, J., and Heller, W., (1981): “ Mathematical analysis and con vexity with applications to economics.” In Handbook o f Mathematical
Economics, volume I, ed. Arrow and Intriligator. North-Holland.
Harary, F., Norman, R.Z., and Cartwright, D., (1965): Structural Mod
els: An Introduction to the Theory o f Directed Graphs. John Wiley &
Sons, New York.
Horn, R.A., and Johnson, C.R., (1985): “Matrix Analysis,” Cambridge University Press, Cambridge.
IRREDUCIBILITY IN EXCHANGE ECONOMIES 134
Kuhn, H., (1956): “On a theorem o f Wald,” Linear equalities and re
lated systems, edited by Kuhn, H., and Tucker, A.W. Princeton Uni
versity Press, pp.265-273.
Maxfield, R.R., (1997): “General Equilibrium and the Theory of Di rected Graphs,” Journal o f Mathematical Economics, 27, 23-51. McKenzie, L.W. (1954): “On equilibrium in Graham’s model of world trade and other competitive systems,” Econometrica, 22, 147-161. McKenzie, L.W. (1955): “Competitive equilibrium with dependent consumer preferences,” Second symposium on linear programming. Na tional Bureau of Standards and Department of the Air Force, pp.277- 294.
McKenzie, L.W. (1959): “On the Existence of General Equilibrium for a Competitive Market,” Econometrica, 27, 54-71.
McKenzie, L.W., (1961): “On the Existence of General Equilibrium: Some Corrections,” Econometrica, 29, 247-248.
McKenzie, L.W., (1981): “The classical theorem on existence of com petitive equilibrium,” Econometrica, 49, 819-841.
Milne, F., (1974): “Corporate investment and finance theory in general equilibrium,” Economic Record, 511-533.
Moore, J., (1975): “The existence o f ‘compensated equilibrium’ and the structure of the Pareto efficiency frontier,” International Economic
Review, 16, no. 2, 267-300.
Nikaido, H., (1956): “On the classical multilateral exchange problem,”
Metroeconomica, 8, 135-145.
Polemarchakis, H.M., and Siconolfi, P., (1997): “Generic existence o f competitive equilibria with restricted participation,” Journal o f Math
ematical Economics, 28, 289-311.
Rosenblatt, D., (1957): “On linear models and the graphs o f Minkowski-Leontief matrices,” Econometrica, 25, 325-338.
Ir r e d u c i b i l i t y i n Ex c h a n g e Ec o n o m i e s 135
Samuelson, P.A., (1958): “An Exact Consumption-Loan Model o f In terest with or Without the Social Contrivance of Money,” The Journal
o f Political Economy, 6, 467-482.
Seneta, E., (1973): Non-negative matrices and Markov chains.
Springer-Verlag.
Simmons, G.F., (1963): Introduction to Topology and Modem Analysis. McGraw-Hill International Editions.
Uzawa, H., (1962): “Walras’ existence theorem and Brouwer’s fixed point theorem,” Economic Studies Quarterly, 13, 59-62.
von Neumann, J., (1937): “Uber ein ökonomisches gleichungssystem und eine Verallgemeinerung des Browerschen fixpunktsatzes,” Ergeb
nisse eines Mathematischen Kolloquiums, 8, 78-83. Translated in Re view of Economic Studies, 13, 1-9.
Wald, A., (1935): “Uber die eindeutige positive losbarkeit der neuen productionsgleichungen,” Ergebnisse eines Mathematischen Kolloqui
ums, 6, 12-20.
Wald, A., (1936): “Uber die productionsgleichungen der ökonomischen wertlehre,” Ergebnisse eines Mathematischen Kolloquiums, 1, 1-6. Wald, A., (1936): “Uber einige gleichungssystem der mathematischen Ökonomie,” Zeitschrift für Nationalökonomie, 7, 637-670. Translated in
Econometrica, 19, 368-403.
Wilson, C.A., (1981): “Equilibrium in Dynamic Models with an Infinity of Agents,” Journal of Economic Theory, 24, 95-111.