COEXISTENCE OF A LIMIT-CYCLE AND AN EQUILIBRIUM IN KALDOR BUSINESS-CYCLE MODEL AND ITS CONSEQUENCES

被引：37

作者：

GRASMAN, J

WENTZEL, JJ

机构：

[1] Department of Mathematics, Agricultural University, 6703 HA Wageningen

来源：

JOURNAL OF ECONOMIC BEHAVIOR & ORGANIZATION | 1994年 / 24卷 / 03期

关键词：

BUSINESS CYCLE; KALDOR MODEL;

D O I：

10.1016/0167-2681(94)90043-4

中图分类号：

F [经济];

学科分类号：

02 ;

摘要：

With asymptotic methods it is shown that in the Kaldor business cycle model co-existence of a stable equilibrium and a stable limit cycle is possible. Its consequences for the dynamics of a model with noise and for periodically driven and mutually coupled Kaldor models are discussed.

引用

页码：369 / 377

页数：9

共 13 条

[1]

[Anonymous], 1984, RANDOM PERTURBATIONS

[2] CRITICAL-DYNAMICS OF THE BONHOEFFER-VANDERPOL EQUATION AND ITS CHAOTIC RESPONSE TO PERIODIC STIMULATION [J].

BRAAKSMA, B ;

GRASMAN, J .

PHYSICA D, 1993, 68 (02) :265-280

[3] EXISTENCE AND PERSISTENCE OF CYCLES IN A NON-LINEAR MODEL - KALDORS 1940 MODEL RE-EXAMINED [J].

CHANG, WW ;

SMYTH, DJ .

REVIEW OF ECONOMIC STUDIES, 1971, 38 (113) :37-44

[4]

De Swart H. E., 1987, Tellus, Series A (Dynamic Meteorology and Oceanography), V39A, P10, DOI 10.1111/j.1600-0870.1987.tb00284.x

[5]

DIENER M, 1981, THESIS IRMA STRASBOU

[6]

ECKHAUS W, 1983, LECT NOTES MATH, V985, P449

[7]

Gabisch G., 1989, BUSINESS CYCLE THEOR

[8]

GARDINE RCW, 1983, HDB STOCHASTIC METHO

[9] ASYMPTOTIC ANALYSIS OF NONLINEAR-SYSTEMS WITH SMALL STOCHASTIC PERTURBATIONS [J].

GRASMAN, J .

MATHEMATICS AND COMPUTERS IN SIMULATION, 1989, 31 (1-2) :41-54

[10]

Grasman J., 1987, ASYMPTOTIC METHODS R

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