Add to ORKGThis paper proposes to estimate the covariance matrix of stock returns by an optimally weighted average of two existing estimators: the sample covariance matrix and single-index covariance matrix. This method is generally known as shrinkage, and it is standard in decision theory and in empirical Bayesian statistics. Our shrinkage estimator can be seen as a way to account for extra-market covariance without having to specify an arbitrary multi-factor structure. For NYSE and AMEX stock returns from 1972 to 1995, it can be used to select portfolios with significantly lower out-of-sample variance than a set of existing estimators, including multi-factor models
Markowitz (1952) portfolio selection requires estimates of (i) the vector of expected returns and (i...
Estimating covariance matrices is an important part of portfolio selection, risk management, and ass...
Decision-making in finance often requires an accurate estimate of the coskewness matrix to optimize ...
This paper proposes to estimate the covariance matrix of stock returnsby an optimally weighted avera...
This paper proposes to estimate the covariance matrix of stock returns by an optimally weighted aver...
Existing factor models struggle to model the covariance matrix for a large number of stocks and fact...
The central message of this paper is that nobody should be using the sample covariance matrix for th...
Harry Markowitz pioneered Modern Portfolio Theory which suggested that portfolio risk should be quan...
Markowitz (1952) portfolio selection requires an estimator of the covariance matrix of returns. To a...
The central message of this paper is that nobody should be using the sample covariance matrix for th...
Existing shrinkage techniques struggle to model the covariance matrix of asset returns in the presen...
International audienceA highly popular regularized (shrinkage) covariance matrix estimator is the sh...
The use of improved covariance matrix estimators as an alternative to the sample estimator is consi...
Many econometric and data-science applications require a reliable estimate of the covariance matrix,...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
Markowitz (1952) portfolio selection requires estimates of (i) the vector of expected returns and (i...
Estimating covariance matrices is an important part of portfolio selection, risk management, and ass...
Decision-making in finance often requires an accurate estimate of the coskewness matrix to optimize ...
This paper proposes to estimate the covariance matrix of stock returnsby an optimally weighted avera...
This paper proposes to estimate the covariance matrix of stock returns by an optimally weighted aver...
Existing factor models struggle to model the covariance matrix for a large number of stocks and fact...
The central message of this paper is that nobody should be using the sample covariance matrix for th...
Harry Markowitz pioneered Modern Portfolio Theory which suggested that portfolio risk should be quan...
Markowitz (1952) portfolio selection requires an estimator of the covariance matrix of returns. To a...
The central message of this paper is that nobody should be using the sample covariance matrix for th...
Existing shrinkage techniques struggle to model the covariance matrix of asset returns in the presen...
International audienceA highly popular regularized (shrinkage) covariance matrix estimator is the sh...
The use of improved covariance matrix estimators as an alternative to the sample estimator is consi...
Many econometric and data-science applications require a reliable estimate of the covariance matrix,...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
Markowitz (1952) portfolio selection requires estimates of (i) the vector of expected returns and (i...
Estimating covariance matrices is an important part of portfolio selection, risk management, and ass...
Decision-making in finance often requires an accurate estimate of the coskewness matrix to optimize ...