We study the estimation of a high dimensional approximate factor model in the presence of both cross sectional dependence and heteroskedasticity. The classical method of principal components analysis (PCA) does not efficiently estimate the factor loadings or common factors because it essentially treats the idiosyncratic error to be homoskedastic and cross sectionally uncorrelated. For the efficient estimation, it is essential to estimate a large error covariance matrix. We assume the model to be conditionally sparse, and propose two approaches to estimating the common factors and factor loadings; both are based on maximizing a Gaussian quasi-likelihood and involve regularizing a large covariance sparse matrix. In the first approach the...
This paper introduces a Projected Principal Component Analysis (Projected-PCA), which is based on th...
We reconcile the two worlds of dense and sparse modeling by exploiting the positive aspects of both....
Bayesian sparse factor models have proven useful for characterizing dependencies in high-dimensional...
We study the estimation of a high dimensional approximate factor model in the presence of both cross...
We study the estimation of a high dimensional approximate factor model in the presence of both cross...
This paper deals with estimation of high-dimensional covariance with a conditional sparsity structur...
An approximate factor model of high dimension has two key features. First, the idiosyncratic errors ...
This paper deals with the estimation of a high-dimensional covariance with a con-ditional sparsity s...
Factor models have been widely used in practice. However, an undesirable feature of a high dimension...
This paper investigates the properties of Quasi Maximum Likelihood estimation of an approximate fact...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
The aim is to develop a new approach to the estimation of the number of factors, factors and factor ...
ABSTRACT: The use of principal component techniques to estimate approximate factor models with large...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
This paper develops an estimation and testing framework for a stationary large panel model with obse...
This paper introduces a Projected Principal Component Analysis (Projected-PCA), which is based on th...
We reconcile the two worlds of dense and sparse modeling by exploiting the positive aspects of both....
Bayesian sparse factor models have proven useful for characterizing dependencies in high-dimensional...
We study the estimation of a high dimensional approximate factor model in the presence of both cross...
We study the estimation of a high dimensional approximate factor model in the presence of both cross...
This paper deals with estimation of high-dimensional covariance with a conditional sparsity structur...
An approximate factor model of high dimension has two key features. First, the idiosyncratic errors ...
This paper deals with the estimation of a high-dimensional covariance with a con-ditional sparsity s...
Factor models have been widely used in practice. However, an undesirable feature of a high dimension...
This paper investigates the properties of Quasi Maximum Likelihood estimation of an approximate fact...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
The aim is to develop a new approach to the estimation of the number of factors, factors and factor ...
ABSTRACT: The use of principal component techniques to estimate approximate factor models with large...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
This paper develops an estimation and testing framework for a stationary large panel model with obse...
This paper introduces a Projected Principal Component Analysis (Projected-PCA), which is based on th...
We reconcile the two worlds of dense and sparse modeling by exploiting the positive aspects of both....
Bayesian sparse factor models have proven useful for characterizing dependencies in high-dimensional...