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Latent Variable Estimation in Bayesian Black-Litterman Models

Portfolio Management 2025-05-06 v1 Machine Learning Econometrics Methodology Machine Learning

Abstract

We revisit the Bayesian Black-Litterman (BL) portfolio model and remove its reliance on subjective investor views. Classical BL requires an investor "view": a forecast vector qq and its uncertainty matrix Ω\Omega that describe how much a chosen portfolio should outperform the market. Our key idea is to treat (q,Ω)(q,\Omega) as latent variables and learn them from market data within a single Bayesian network. Consequently, the resulting posterior estimation admits closed-form expression, enabling fast inference and stable portfolio weights. Building on these, we propose two mechanisms to capture how features interact with returns: shared-latent parametrization and feature-influenced views; both recover classical BL and Markowitz portfolios as special cases. Empirically, on 30-year Dow-Jones and 20-year sector-ETF data, we improve Sharpe ratios by 50% and cut turnover by 55% relative to Markowitz and the index baselines. This work turns BL into a fully data-driven, view-free, and coherent Bayesian framework for portfolio optimization.

Keywords

Cite

@article{arxiv.2505.02185,
  title  = {Latent Variable Estimation in Bayesian Black-Litterman Models},
  author = {Thomas Y. L. Lin and Jerry Yao-Chieh Hu and Paul W. Chiou and Peter Lin},
  journal= {arXiv preprint arXiv:2505.02185},
  year   = {2025}
}

Comments

Accepted at ICML 2025

R2 v1 2026-06-28T23:20:45.074Z