连续时间理性预期模型的鞍点问题:一种一般方法及若干宏观经济例子

W. Buiter
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引用次数: 177

摘要

本文给出了用系统表示的理性期望模型的一种通解方法。常系数确定性一阶线性微分方程。它是对Blanchard和Kahn方法的连续时间适应。为了得到唯一解,必须有和线性独立状态变量一样多的线性独立边界条件。一个著名的小型开放经济宏观经济模型的三个略有不同的版本被用来说明指定所需边界条件的三种相当一般的方法。第一类是稳定特征根的个数等于预定变量的个数的标准情形。第二种情况是稳定根的数量超过预定变量的数量,但等于预定变量的数量加上“向后看”但非预定变量的数量,这些变量的不连续度是前瞻变量不连续度的线性函数。第三种情况是不稳定根的数量小于前向状态变量的数量。对于最后一种情况,建议边界条件涉及对未来日期状态变量值的线性限制。本文方法允许具有大量状态变量的模型的数值解。可以分析预期或未预期、当前或未来、永久或短暂冲击的任何组合。
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Saddlepoint Problems in Contifuous Time Rational Expectations Models: A General Method and Some Macroeconomic Ehamples
The paper presents a general solution method for rational expectations models that can be represented by systems of. deterministic first order linear differential equations with constant coefficients. It is the continuous time adaptation of the method of Blanchard and Kahn. To obtain a unique solution there must be as many linearly independent boundary conditions as there are linearly independent state variables. Three slightly different versions of a well-known small open economy macroeconomic model were used to illustrate three fairly general ways of specifying the required boundary conditions. The first represents the standard case in which the number of stable characteristic roots equals the number of predetermined variables. The second represents the case where the number of stable roots exceeds the number of predetermined variables but equals the number of predetermined variables plus the number of "backward-looking" but non-predetermined variables whose discontinuities are linear functions of the discontinuities in the forward-looking variables. The third represents the case where the number of unstable roots is less than the number of forward-looking state variables. For the last case, boundary conditions are suggested that involve linear restrictions on the values of the state variables at a future date. The method of this paper permits the numerical solution of models with large numbers of state variables. Any combination of anticipated or unanticipated, current or future and permanent or transitory shocks can be analyzed.
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