Markowitz’s mean-variance portfolio optimization is either inefficient or impossible when the number of assets becomes relatively large. To overcome this difficulty, we propose several component-wise boosting learning methods that, in a linear regression specification, can iteratively select the assets (variables) with the largest contribution to the fit from a huge number of assets. Based on dataset consisting of 897 assets with 624 observations obtained from Ken French data library, we assess the performance of tangency portfolios estimated using our methods. We find that our methods substantially outperform the 1/N portfolio in terms of various popular metrics. For example, our component-wise LogitBoost can reach an out-of-sample Sharpe ...
Portfolio selection involves a trade-off between maximizing expected return and minimizing risk. In ...
We introduce a flexible utility-based empirical approach to directly determine asset allocation deci...
We revisit in this article the Two-Fund Separation Theorem as a simple technique for the Mean–Varia...
As the cornerstone of the modern portfolio theory, Markowitz's mean-variance optimization is a major...
Estimating and assessing the variance-covariance matrix (risk) of a large portfolio is an important ...
We model portfolio weights as a function of latent factors that summarize the information in a large...
The Markowitz mean-variance optimization model is a widely used tool for portfolio selection. Howeve...
I use machine learning stock return predictions to improve minimum variance and Sharpe ratio maximiz...
The Markowitz mean-variance optimization model is a widely used tool for portfolio selection. Howev...
This research incorporates Bayesian estimation and optimization into portfolio selection framework, ...
The purpose of this thesis is to review and expand the main result in the paper by Daniel Kinn, "Red...
We propose a novel approach to optimizing portfolios with large numbers of assets. We model directly...
International audienceMachine learning algorithms and big data are transforming all industries inclu...
Modern Portfolio Theory (MPT) has been the canonical theoretical model of portfolio selection for ov...
The mean-variance principle of Markowitz (1952) for portfolio selection gives disappointing results ...
Portfolio selection involves a trade-off between maximizing expected return and minimizing risk. In ...
We introduce a flexible utility-based empirical approach to directly determine asset allocation deci...
We revisit in this article the Two-Fund Separation Theorem as a simple technique for the Mean–Varia...
As the cornerstone of the modern portfolio theory, Markowitz's mean-variance optimization is a major...
Estimating and assessing the variance-covariance matrix (risk) of a large portfolio is an important ...
We model portfolio weights as a function of latent factors that summarize the information in a large...
The Markowitz mean-variance optimization model is a widely used tool for portfolio selection. Howeve...
I use machine learning stock return predictions to improve minimum variance and Sharpe ratio maximiz...
The Markowitz mean-variance optimization model is a widely used tool for portfolio selection. Howev...
This research incorporates Bayesian estimation and optimization into portfolio selection framework, ...
The purpose of this thesis is to review and expand the main result in the paper by Daniel Kinn, "Red...
We propose a novel approach to optimizing portfolios with large numbers of assets. We model directly...
International audienceMachine learning algorithms and big data are transforming all industries inclu...
Modern Portfolio Theory (MPT) has been the canonical theoretical model of portfolio selection for ov...
The mean-variance principle of Markowitz (1952) for portfolio selection gives disappointing results ...
Portfolio selection involves a trade-off between maximizing expected return and minimizing risk. In ...
We introduce a flexible utility-based empirical approach to directly determine asset allocation deci...
We revisit in this article the Two-Fund Separation Theorem as a simple technique for the Mean–Varia...