利用双曲交叉求解非线性宏观经济模型

IF 1.9 3区经济学 Q2 ECONOMICS

Journal of Economic Dynamics & Control Pub Date : 2024-04-09 DOI:10.1016/j.jedc.2024.104860

Richard Dennis

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引用次数: 0

摘要

本文介绍了一种基于双曲交叉的稀疏网格逼近方法，并将其应用于求解非线性宏观经济模型。我们展示了如何对标准双曲交叉进行扩展，以便对近似网格进行更好的控制，并讨论了如何实现各向异性双曲交叉。我们将该近似方法应用于四个宏观经济模型，结果表明，该方法的精确度与斯莫利亚克方法相当或更高，而且与斯莫利亚克方法相比，该方法可以使用更少的点来产生精确的近似值。

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Using a hyperbolic cross to solve non-linear macroeconomic models

The paper presents a sparse grid approximation method based on the hyperbolic cross and applies it to solve non-linear macroeconomic models. We show how the standard hyperbolic cross can be extended to give greater control over the approximating grid and we discuss how to implement an anisotropic hyperbolic cross. Applying the approximation method to four macroeconomic models, we establish that it delivers a level of accuracy on par or better than Smolyak's method and that it can produce accurate approximations using fewer points than Smolyak's method.

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来源期刊

Journal of Economic Dynamics & Control ECONOMICS-

CiteScore

3.10

自引率

10.50%

发文量

199

期刊介绍： The journal provides an outlet for publication of research concerning all theoretical and empirical aspects of economic dynamics and control as well as the development and use of computational methods in economics and finance. Contributions regarding computational methods may include, but are not restricted to, artificial intelligence, databases, decision support systems, genetic algorithms, modelling languages, neural networks, numerical algorithms for optimization, control and equilibria, parallel computing and qualitative reasoning.