Problems of Stability of Dynamic Macroeconomic Models Voronin A. V., Gunko O. V., Аfanasieva L. M.
Voronin, Anatolii V., Gunko, Olga V., and Аfanasieva, Lidiia M. (2019) “Problems of Stability of Dynamic Macroeconomic Models.” The Problems of Economy 2:185–193. https://doi.org/10.32983/2222-0712-2019-2-185-193
Section: Mathematical methods and models in economy
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UDC 313.42
Abstract: This paper deals with the problems of stabilizing economic growth using traditional macroeconomic strategies. The goal taken implies a large-scale use of the machinery of the qualitative theory of discrete economic dynamics. A set of economic and mathematical models that take into consideration the specifics of macroeconomic equilibrium in view of neo-Keynesian economics is proposed. It is essential to analyze the residual effect caused by the “dynamic memory” of all previous values in relation to the present moment in time in the investment policy and the consumption structure. When building dynamic models of economic growth of Gross Domestic Product, functional equations of a specific type, such as Volterra difference equations, were obtained. Accordingly, for each of the above functional equations studied, there received a number of inequalities that determine the domains of parametric stability of the equilibrium. Structural constraints of the basic parameters of the multiplier-accelerator model, which can have a significant impact on the distribution of consumption and investment to ensure sustainable growth of national income, are formulated in an explicit form. There indicated conditions for constraining such parameters as the accelerator capacity and marginal propensity to save, which should be taken into account when developing economic and mathematical models for the purposes of forecasting and managing national macroeconomic policies. Graphic illustrations of the obtained solutions to the corresponding difference equations of the national income behavior are presented.
Keywords: gross domestic product, macroeconomic equilibrium, residual effect, investment policy, parametric stability of an equilibrium state, multiplier-accelerator model.
Fig.: 2. Formulae: 39. Bibl.: 10.
Voronin Anatolii V. – Candidate of Sciences (Engineering), Associate Professor, Associate Professor, Department of Mathematics and Economic and Mathematical Methods, Simon Kuznets Kharkiv National University of Economics (9a Nauky Ave., Kharkіv, 61166, Ukraine) Email: voronin61@ ukr.net Gunko Olga V. – Candidate of Sciences (Physics and Mathematics), Associate Professor, Associate Professor, Department of Mathematics and Economic and Mathematical Methods, Simon Kuznets Kharkiv National University of Economics (9a Nauky Ave., Kharkіv, 61166, Ukraine) Email: Olha.Hunko@m.hneu.edu Аfanasieva Lidiia M. – Candidate of Sciences (Engineering), Associate Professor, Associate Professor, Department of Higher Mathematics and Economic and Mathematical Methods, Simon Kuznets Kharkiv National University of Economics (9a Nauky Ave., Kharkіv, 61166, Ukraine) Email: Lidiia.Afanasieva@m.hneu.edu.ua
List of references in article
Allen, R. Matematicheskaya ekonomiya [Mathematical economy]. Moscow: Izd-vo inostr. lit., 1963.
Barro, R., and Sala-i-Martin, Kh. Ekonomicheskiy rost [The economic growth]. Moscow: BINOM. Laboratoriya znaniy, 2010.
Makarov, I., and Menskiy, B. Tablitsa obratnykh preobrazovaniy Laplasa i obratnykh Z-preobrazovaniy: Drobno-ratsionalnyye izobrazheniya [Table of inverse Laplace transforms and inverse Z-transformations: Fractional rational images]. Moscow: Vysshaya shk., 1978.
Prasolov, A. V. Matematicheskiye metody ekonomicheskoy dinamiki [Mathematical methods of economic dynamics]. St. Petersburg: Lan, 2008.
Pu, T. Nelineynaya ekonomicheskaya dinamika [Nonlinear economic dynamics]. Moscow; Izhevsk: NITs «Regulyarnaya i khaoticheskaya dinamika», 2000.
Barro, R. “Economic Growth in a Cross Section of Countries“. Quarterly Journal of Economics, vol. 106 (5) (1991): 407-443.
Duczynsti, P. “Capital Mobility in Neoclassical Models of Growth“. American Economic Review, vol. 90 (6) (2001): 687-694.
Elaydi, S. An Introduction To Difference Equations. New York: Springer, 2005.
Elaydi, S. “Stability of Volterra difference equations of convolution type“. Proceeding of The Special Program at Nankai Institute of Mathematics. Singapore: Word Scientific, 1993. 66-73.
Hancen, R., Gory, D., and Prescott, E. “Malthus to Solow“. American Economic Review, vol. 92 (9) (2002): 1205-1217.
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