Existence and uniqueness of perturbation solutions to DSGE models
Year of publication: |
2012
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Authors: | Lan, Hong ; Meyer-Gohde, Alexander |
Publisher: |
Berlin : Humboldt University of Berlin, Collaborative Research Center 649 - Economic Risk |
Subject: | Dynamisches Gleichgewicht | Matrizenrechnung | Theorie | perturbation | matrix calculus | DSGE | solution methods | Bézout theorem | Sylvester equations |
Series: | SFB 649 Discussion Paper ; 2012-015 |
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Type of publication: | Book / Working Paper |
Type of publication (narrower categories): | Working Paper |
Language: | English |
Other identifiers: | 68553572X [GVK] hdl:10419/56743 [Handle] |
Classification: | C61 - Optimization Techniques; Programming Models; Dynamic Analysis ; C63 - Computational Techniques ; E17 - Forecasting and Simulation |
Source: |
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Existence and Uniqueness of Perturbation Solutions to DSGE Models
Lan, Hong, (2012)
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Existence and Uniqueness of Perturbation Solutions in DSGE Models
Lan, Hong, (2012)
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Solving DSGE models with a nonlinear moving average
Lan, Hong, (2011)
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Solving DSGE Models with a Nonlinear Moving Average
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Solving DSGE models with a nonlinear moving average
Lan, Hong, (2013)
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Solvability of perturbation solutions in DSGE models
Lan, Hong, (2014)
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