Journal of Dynamics and Games (JDG)

Optimal control indicators for the assessment of the influence of government policy to business cycle shocks
Pages: 79 - 104, Issue 1, January 2014

doi:10.3934/jdg.2014.1.79      Abstract        References        Full text (978.4K)           Related Articles

John Leventides - Department of Economics, Division of Mathematics-Informatics, National and Kapodistrian University of Athens, 8 Pesmazoglou Street, Athens, 105 59, Greece (email)
Iraklis Kollias - Department of Economics, Division of Mathematics-Informatics, National and Kapodistrian University of Athens, 8 Pesmazoglou Street, Athens, 105 59, Greece (email)

1 A. G. Malliaris and J. L. Urrutia, How big is the random walk in macroeconomic time series: Variance ratio tests, Economic Uncertainty, Instabilities And Asset Bubbles, (2005), 9-12.
2 C. Burnside and M. Eichenbaum, Factor Hoarding and the Propagation of Business Cycle Shocks, American Economic Review, 86 (1996), 1154-1174.
3 C. R. Nelson and C. I. Plosser, Trends and random walks in macroeconomic time series: Some evidence and implications, Journal of Monetary Economics, 10 (1982), 139-162.
4 D. E. W. Laidler, An elementary monetarist model of simultaneous fluctuations in prices and output, in "Inflation in Small Countries" (ed. H. Frisch), Lecture Notes in Economics and Mathematical Systems, 119, Springer, Berlin-Heidelberg, (1976), 75-89.
5 F. Canova, Detrending and business cycle facts, Journal of Monetary Economics, 41 (1998), 475-512.
6 F. E. Kydland and E. C. Prescott, Time to build and aggregate fluctuations, Econometrica, 50 (1982), 1345-1370.
7 J.-O. Cho and T. F. Cooley, The business cycle with nominal contracts, Economic Theory, 6 (1995), 13-33.
8 J. B. Long, Jr. and C. I. Plosser, Real business cycles, Journal of Political Economy, 91 (1983), 39-69.
9 J. H. Stock and M. W. Watson, Does GNP have a unit root?, Economics Letters, 22 (1986), 147-151.
10 J. Y. Campbell and N. G. Mankiw, Are output fluctuations transitory?, The Quarterly Journal of Economics, 102 (1987), 857-880.
11 L. J. Christiano and M. Eichenbaum, Current real-business cycle theories and aggregate labor-market fluctuations, American Economic Review, 82 (1992), 430-450.
12 L. J. Christiano and M. Eichenbaum, Unit roots in real GNP: Do we know and do we care?, Carnegie-Rochester Conference Series on Public Policy, 32 (1990), 7-62.
13 Lutz Arnold, "Business Cycle Theory," Oxford University Press, 2002.
14 M. Boldrin and M. Horvath, Labor contracts and business cycles, Journal of Political Economy, 103 (1995), 972-1004.
15 N. G. Mankiw and D. Romer, "New Keynesian Economics," Vols. 1 and 2, Cambridge University Press, 1991.
16 O. J. Blanchard and S. Fischer, "Lectures in Macroeconomics," MIT Press, Cambridge, 1989.
17 Philip R. Lane, The cyclical behaviour of fiscal policy: Evidence from the OECD, Journal of Public Economics, 87 (2003), 2661-2675.
18 R. Cottle, J. Pang and R. Stone, "Linear Complimentarity Problem," Classics in Applied Mathematics, SIAM, 2009.
19 R. E. Lucas, Jr., Econometric policy evaluation: A critique, in "Carnegie-Rochester Conference Series on Public Policy," Elsevier, North Holland, Amsterdam, (1976), 19-46.
20 R. E. A. Farmer and J.-T. Guo, Real business cycles and the animal spirits hypothesis, Journal of Economic Theory, 63 (1994), 42-72.
21 R. G. King and S. T. Rebelo, Resuscitating real business cycles, in "Handbook of Macroeconomics" (eds. J. B. Taylor and M. Woodford), North Holland, Amsterdam, (1999), 927-1007.
22 R. G. D. Allen, "Macroeconomic Theory: A Mathematical Treatment," Macmillan, London, 1967.
23 R. Neck, The Contribution of Control Theory to the Analysis of Economic Policy, in "Proceedings of the $17^th$ World Congress," The International Federation of Automatic Control, Seoul, (2008), 6-11.
24 V. R. Bencivenga, An econometric study of hours and output variation with preference shocks, International Economic Review, 33 (1992), 449-471.
25 S. Boyd and L. Vandenberghe, "Convex Optimization," Cambridge University Press, Cambridge, 2004.       
26 T. Puu and I. Sushko, A business cycle model with cubic nonlinearity, Chaos, Solitons and Fractals, 19 (2004), 597-612.       

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