Behaviour of the NORTA method for correlated random vector generation as the dimension increases. Ghosh, S. & Henderson, S. ACM Transactions on Modeling and Computer Simulation, 13:276–294, 2003.
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Paper abstract bibtex 2 downloads
Corrigendumone Corrigendumtwo Paper abstract bibtex 2 downloads The NORTA method is a fast general-purpose method for generating samples of a random vector with given marginal distributions and given correlation matrix. It is known that there ex- ist marginal distributions and correlation matrices that the NORTA method cannot match, even though a random vector with the prescribed qualities exists. We investigate this problem as the di- mension of the random vector increases. Simulation results show that the problem rapidly becomes acute, in the sense that NORTA fails to work with an increasingly large proportion of correlation matrices. Simulation results also show that if one is willing to settle for a correlation matrix that is ``close'' to the desired one, then NORTA performs well with increasing dimension. As part of our analysis, we develop a method for sampling correlation matrices uniformly (in a certain precise sense) from the set of all such matrices. This procedure can be used more generally for sampling uniformly from the space of all symmetric positive definite matrices with diagonal elements fixed at positive values.
@article{ghohen03,
abstract = {The NORTA method is a fast general-purpose method for generating samples of a random vector with given marginal distributions and given correlation matrix. It is known that there ex- ist marginal distributions and correlation matrices that the NORTA method cannot match, even though a random vector with the prescribed qualities exists. We investigate this problem as the di- mension of the random vector increases. Simulation results show that the problem rapidly becomes acute, in the sense that NORTA fails to work with an increasingly large proportion of correlation matrices. Simulation results also show that if one is willing to settle for a correlation matrix that is ``close'' to the desired one, then NORTA performs well with increasing dimension. As part of our analysis, we develop a method for sampling correlation matrices uniformly (in a certain precise sense) from the set of all such matrices. This procedure can be used more generally for sampling uniformly from the space of all symmetric positive definite matrices with diagonal elements fixed at positive values.},
annote = {pubs/NORTAHighD.pdf},
author = {Ghosh, S. and Henderson, S.~G.},
date-added = {2016-01-10 16:07:54 +0000},
date-modified = {2018-07-16 17:38:20 +0000},
journal = {ACM Transactions on Modeling and Computer Simulation},
pages = {276--294},
title = {Behaviour of the {NORTA} method for correlated random vector generation as the dimension increases},
url_corrigendumone = {pubs/corrig1.pdf},
url_corrigendumtwo = {pubs/corrig2.pdf},
url_paper = {https://dl.acm.org/authorize?N654079},
volume = {13},
year = 2003}Downloads: 2
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