Parallel Krylov Methods for Econometric Model Simulation

This paper investigates parallel solution methods to simulate large-scale macroeconometric models with forward-looking variables. The method chosen is the Newton-Krylov algorithm, and we concentrate on a parallel solution to the sparse linear system arising in the Newton algorithm. We empirically analyze the scalability of the GMRES method, which belongs to the class of so-called Krylov subspace methods. The results obtained using an implementation of the PETSc 2.0 software library on an IBM SP2 show a near linear scalability for the problem tested.

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Year of publication:	2000
Authors:	Pauletto, Giorgio ; Gilli, Manfred
Published in:	Computational Economics. - Society for Computational Economics - SCE, ISSN 0927-7099. - Vol. 16.2000, 1/2, p. 173-186
Publisher:	Society for Computational Economics - SCE
Subject:	parallel computing \| Newton-Krylov methods \| sparse matrices \| forward-looking models \| GMRES \| scalability

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Extent:	text/html
Type of publication:	Article
Source:	RePEc - Research Papers in Economics

Persistent link: https://www.econbiz.de/10005701752