Abstract
AbstractIn this article we deal with the problem of portfolio allocation by enhancing network theory tools. We propose the use of the correlation network dependence structure in constructing some well-known risk-based models in which the estimation of the correlation matrix is a building block in the portfolio optimization. We formulate and solve all these portfolio allocation problems using both the standard approach and the network-based approach. Moreover, in constructing the network-based portfolios we propose the use of three different estimators for the covariance matrix: the sample, the shrinkage toward constant correlation and the depth-based estimators . All the strategies under analysis are implemented on three high-dimensional portfolios having different characteristics. We find that the network-based portfolio consistently performs better and has lower risk compared to the corresponding standard portfolio in an out-of-sample perspective.
Funder
Gruppo Nazionale per l’Analisi Matematica, la Probabilitã e le loro Applicazioni
Publisher
Springer Science and Business Media LLC
Subject
Management Science and Operations Research,General Decision Sciences
Reference66 articles.
1. Amenc, N., & Goltz, F. (2013). Smart Beta 2.0. The Journal of Index Investing, 4(3), 15–23.
2. Barrat, A., Barthélemy, M., Pastor-Satorras, R., & Vespignani, A. (2004). The architecture of complex weighted networks. Proceedings of the National Academy of Sciences, 101(11), 3747–3752.
3. Bauder, D., Bodnar, T., Parolya, N., & Schmid, W. (2018). Bayesian mean-variance analysis: Optimal portfolio selection under parameter uncertainty. arXiv:1803.03573
4. Behr, P., Guettler, A., & Miebs, F. (2013). On portfolio optimization: Imposing the right constraints. Journal of Banking & Finance, 37(4), 1232–1242.
5. Benati, S., & Conde, E. (2022). A relative robust approach on expected returns with bounded CVar for portfolio selection. European Journal of Operational Research, 296(1), 332–352.
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