This research incorporates Bayesian estimation and optimization into portfolio selection framework, particularly for high-dimensional portfolio in which the number of assets is strictly larger than the number of observations. We leverage a portfolio selection model, called Linear Programming Optimal (LPO) portfolio, which utilizes a constrained l1 minimization approach to directly estimate effective parameters appearing in the optimal portfolio. We propose 2 refinements for the existing LPO strategy. First, we explore improved estimators of returns mean and covariance matrix by utilizing Bayesian estimates instead of sample estimates. Second, we introduce Bayesian optimization (BO) to replace traditional grid search cross-validation (CV) in...
This paper contributes to portfolio selection methodology using a Bayesian fore-cast of the distribu...
This paper aims to study stable portfolios with mean-variance-CVaR criteria for high-dimensional dat...
Bayesian optimization is a sample-efficient method for black-box global optimization. How-ever, the ...
This research incorporates Bayesian estimation and optimization into portfolio selection framework, ...
The concept of portfolio optimization has been widely studied in the academy and implemented in the ...
This paper studies the mean-variance (MV) portfolio problems under static and dynamic settings, part...
Bayesian optimization forms a set of powerful tools that allows efficient blackbox optimization and...
The paper solves the problem of optimal portfolio choice when the parameters of the asset returns di...
Portfolio selection involves a trade-off between maximizing expected return and minimizing risk. In ...
This thesis concerns portfolio theory from a Bayesian perspective and it includes two papers related...
We propose a novel family of Bayesian learning algorithms for online portfolio selection that overco...
Modern Portfolio Theory (MPT) has been the canonical theoretical model of portfolio selection for ov...
We develop two dynamic Bayesian portfolio allocation models that address questions of learning and m...
Portfolio methods provide an effective, principled way of combining a collection of acquisition func...
Estimating and assessing the variance-covariance matrix (risk) of a large portfolio is an important ...
This paper contributes to portfolio selection methodology using a Bayesian fore-cast of the distribu...
This paper aims to study stable portfolios with mean-variance-CVaR criteria for high-dimensional dat...
Bayesian optimization is a sample-efficient method for black-box global optimization. How-ever, the ...
This research incorporates Bayesian estimation and optimization into portfolio selection framework, ...
The concept of portfolio optimization has been widely studied in the academy and implemented in the ...
This paper studies the mean-variance (MV) portfolio problems under static and dynamic settings, part...
Bayesian optimization forms a set of powerful tools that allows efficient blackbox optimization and...
The paper solves the problem of optimal portfolio choice when the parameters of the asset returns di...
Portfolio selection involves a trade-off between maximizing expected return and minimizing risk. In ...
This thesis concerns portfolio theory from a Bayesian perspective and it includes two papers related...
We propose a novel family of Bayesian learning algorithms for online portfolio selection that overco...
Modern Portfolio Theory (MPT) has been the canonical theoretical model of portfolio selection for ov...
We develop two dynamic Bayesian portfolio allocation models that address questions of learning and m...
Portfolio methods provide an effective, principled way of combining a collection of acquisition func...
Estimating and assessing the variance-covariance matrix (risk) of a large portfolio is an important ...
This paper contributes to portfolio selection methodology using a Bayesian fore-cast of the distribu...
This paper aims to study stable portfolios with mean-variance-CVaR criteria for high-dimensional dat...
Bayesian optimization is a sample-efficient method for black-box global optimization. How-ever, the ...