2020
DOI: 10.3390/e22040456
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De-Biased Graphical Lasso for High-Frequency Data

Abstract: This paper develops a new statistical inference theory for the precision matrix of high-frequency data in a high-dimensional setting. The focus is not only on point estimation but also on interval estimation and hypothesis testing for entries of the precision matrix. To accomplish this purpose, we establish an abstract asymptotic theory for the weighted graphical Lasso and its de-biased version without specifying the form of the initial covariance estimator. We also extend the scope of the theory to the case t… Show more

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Cited by 6 publications
(4 citation statements)
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“…However, these approaches rule out the presence of an approximate factor structure, as they assume unconditional sparsity of the composite error term v it . It is clear that sparsity of v it fails given our (pervasive) factor structure, as pointed out by Barigozzi et al (2018), Brownlees et al (2018) and Koike (2020).…”
Section: Estimating the Number Of Factorsmentioning
confidence: 93%
“…However, these approaches rule out the presence of an approximate factor structure, as they assume unconditional sparsity of the composite error term v it . It is clear that sparsity of v it fails given our (pervasive) factor structure, as pointed out by Barigozzi et al (2018), Brownlees et al (2018) and Koike (2020).…”
Section: Estimating the Number Of Factorsmentioning
confidence: 93%
“…Since our interest is in constructing weights for the forecast combination, our goal is to estimate a precision matrix of the forecast errors. However, as pointed out by Koike (2020), when common factors are present across the forecast errors, the precision matrix cannot be sparse because all pairs of the forecast errors are partially correlated given other forecast errors through the common factors.…”
Section: Factor Graphical Models For Forecast Errorsmentioning
confidence: 99%
“…Therefore, we impose a sparsity assumption on the precision matrix of the idiosyncratic errors, Θ ε , which is obtained using the estimated residuals after removing the co-movements induced by the factors (see Barigozzi et al (2018); Brownlees et al (2018); Koike (2020)).…”
Section: Factor Graphical Models For Forecast Errorsmentioning
confidence: 99%
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