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Quantitative Finance Volume 22, 2022 - Issue 2
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Research Papers

Sparse index clones via the sorted ℓ1-Norm

Philipp J. Kremer† Department of Finance and Accounting, EBS Universität für Wirtschaft und Recht, Wiesbaden, GermanyORCID Iconhttps://orcid.org/0000-0002-2618-6523View further author information
ORCID Icon,
Damian Brzyski‡ Faculty of Pure and Applied Mathematics, Wroclaw University of Science and Technology, Wroclaw, PolandView further author information
,
Małgorzata Bogdan§ Department of Mathematics, University of Wroclaw, Wroclaw, Poland;¶ Department of Statistics, Lund University, Lund, SwedenORCID Iconhttps://orcid.org/0000-0002-0657-4342View further author information
ORCID Icon &
Sandra Paterlini∥ Department of Economics and Management, University of Trento, Trento, ItalyCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0003-4269-4496View further author information
ORCID Icon
Pages 349-366 | Received 10 Dec 2020, Accepted 26 Jul 2021, Published online: 15 Sep 2021

References

  • Amenc, N., Géhin, W.M. and Meyfredi, J.-C., Passive hedge fund replication: A critical assessment of existing techniques. J. Altern. Invest., 2008, 11(2), 69–83.
  • Amenc, N., Martellini, L., Meyfredi, J.-C. and Ziemann, V., Passive hedge fund replication – Beyond the linear case. Eur. Financ. Manage., March 2010, 16(2), 191–210.
  • Bellec, P.C., Lecué, G. and Tysbakov, A.B., Bounds on the prediction error of penalized least squares estimators with convex penalty. In Modern Problems of Stochastic Analysis and Statistics, Festschrift in honor of Valentin Konakov, edited by V. Panov, 2016.
  • Bellec, P.C., Lecué, G. and Tsybakov, A.B., Slope meets lasso: Improved oracle bounds and optimality. Ann. Stat., December 2018, 46(6B), 3603–3642. https://doi.org/https://doi.org/10.1214/17-AOS1670
  • Bogdan, M. and Frommlet, F., Identifying important predictors in large data bases – Multiple testing and model selection. In Handbook of Multiple Comparisons, edited by X. Cui, T. Dickhaus, Y. Ding, and J.C. Hsu, 2021 (Chapman & Hall/CRC). Available online at: https://arxiv.org/abs/2011.12154.
  • Bogdan, M., van den Berg, E., Su, W. and Candès, E.J., Statistical estimation and testing via the ordered ℓ1 norm. arXiv:1310.1969, pp. 1–46, 2013.
  • Bogdan, M., van den Berg, E., Sabatti, C., Su, W. and Candes, E.J., SLOPE – Adaptive variable selection via convex optimization. Ann. Appl. Statist., 2015, 9(3), 1103–1140.
  • Bondell, H. and Reich, B., Simultaneous regression shrinkage, variable selection, and supervised clustering of predictors with OSCAR. Biometrics, 2008, 64(1), 115–123.
  • Branger, N., Lucivjanska, K. and Weissensteiner, A., Optimal granularity for portfolio choice. J. Empir. Finance, 2019, 50(C), 125–146.
  • Brodie, J., Daubechies, I., DeMol, C., Giannone, D. and Loris, D., Sparse and stable Markowitz portfolios. Proc. Nat. Acad. Sci., 2009, 106(30), 12267–12272.
  • Brzyski, D., Gossmann, A., Su, W. and Bogdan, M., Group slope – Adaptive selection of groups of predictors. J. Am. Stat. Assoc., 2018, 114(525), 419–433. https://doi.org/https://doi.org/10.1080/01621459.2017.1411269
  • Canakgoz, N.A. and Beasley, J.E., Mixed-integer programming approaches for index tracking and enhanced indexation. Eur. J. Oper. Res., 2009, 196(1), 384–399.
  • Candes, E., Waking, M.B. and Boyd, S.P., Enhencing sparsity by reweighted ℓ1 mminimization. J. Fourier Anal. Appl., 2008, 14(5), 877–905.
  • Carrasco, M. and Noumon, N., Optimal portfolio selection using regularization. Working Paper University of Montreal, pp. 1–52, 2012.
  • Chen, S. and Donoho, D., Basis pursuit. In Proceedings of 1994 28th Asilomar Conference on Signals, Systems and Computers, Vol. 1, pp. 41–44, 1994 (IEEE).
  • Chen, C., Li, X., Tolman, C., Wang, S. and Ye, Y., Sparse portfolio selection via quasi-norm regularization. Papers 1312.6350, arXiv.org, 2013.
  • Chiam, S.C., Tan, K.C. and Al Mamun, A., Dynamic index tracking via multi-objective evolutionary algorithm. Appl. Soft. Comput., 2013, 13(7), 3392–3408.
  • DeMiguel, V., Garlappi, L., Nogales, F. and Uppal, R., A generalized approach to portfolio optimization: Improving performance by constraining portfolio norm. Manage. Sci., 2009, 55(5), 798–812.
  • Diebold, F.X. and Mariano, R.S., Comparing predictive accuracy. J. Bus. Econ. Stat., 1995, 13, 134–144.
  • Fan, J. and Li, R., Variable selection via nonconcave penalized likelihood and its oracle properties. J. Am. Stat. Assoc., 2001, 96(456), 1348–1360.
  • Fan, J., Zhang, J. and You, K., Vast portfolio selection with gross-exposure constraint. J. Am. Stat. Assoc., 2012, 107(498), 592–606.
  • Fastrich, B., Paterlini, S. and Winker, P., Cardinality versus q-norm constraints for index tracking. Quant. Finance, 2014, 14(11), 2019–2032.
  • Fastrich, B., Paterlini, S. and Winker, P., Constructing optimal sparse portfolios using regularization methods. Comput. Manage. Sci., 2015, 12(3), 417–434.
  • Fernholtz, R., Garvy, R. and Hannon, J., Diversity-weighted indexing. J. Portfolio Manage., 1998, 4(2), 74–82.
  • Figueiredo, M. and Nowak, R., Sparse estimation with strongly correlated variables using ordered weighted ℓ1 regularization. arXiv:1409.4005, Working Paper, pp. 1–15, 2014.
  • Frino, A. and Gallagher, D., Tracking S&P Index funds. J. Portfolio Manage., 2001, 28(1), 44–55.
  • Fung, W. and Hsieh, D.A., Will hedge funds regress towards index-like products? J. Invest. Manage., 2007, 5(32), 46–65.
  • Giamouridis, D. and Paterlini, S., Regular(ized) hedge fund clones. J. Financ. Res., 2010, 33(3), 223–247.
  • Gilli, M. and Kellezi, E., The threshold accepting heuristic for index tracking. In Financial Engineering, E-Commerce, and Supply Chain, pp. 1–18, 2009 (Kluwer: Dordrecht).
  • Gilli, M. and Winker, P., Heuristic optimization methods in econometrics. In Handbook of Computational Econometrics, edited by D. Beasley and E. Kontoghiorghes, pp. 81–120, 2009 (Wiley).
  • Giuzio, M., Genetic algorithm versus classical methods in sparse index tracking. Decis. Econ. Finance, 2017, 40(1-2), 243–256.
  • Giuzio, M and Paterlini, S., Un-diversifying during crises: Is it a good idea?. Comput. Manage. Sci., 2018. https://doi.org/https://doi.org/10.1007/s10287-018-0340-y
  • Giuzio, M., Eichhorn-Schott, K., Paterlini, S. and Weber, V., Tracking hedge funds using sparse clones. Ann. Oper. Res., 2018, 266(1–2), 349–371.
  • Golosnoy, V., Gribisch, B. and Seifert, M.I., Exponential smoothing of realized portfolio weights. J. Empir. Finance, 2019, 53, 222–237.
  • Gu, S., Kelly, B. and Xiu, D., Empirical asset pricing via machine learning. Rev. Financ. Stud., 2020, 33, 2223–2273. https://doi.org/https://doi.org/10.1093/rfs/hhaa009
  • Hastie, T., Tibshirani, R. and Friedman, J., The Elements of Statistical Learning - Data Mining, Inference and Prediction, 2nd ed. 2001 (Springer: Stanford, CA).
  • Kremer, P.J., Talmaciu, A. and Paterlini, S., Risk minimization in multi-factor portfolios: What is the best strategy?. Ann. Oper. Res., 2018, 266(1–2), 255–291.
  • Kremer, P.J., Lee, S., Bogdan, M. and Paterlini, S., Sparse portfolio selection via the sorted ℓ1-norm. J. Bank. Finance, 2020, 110(6B), 1–41.
  • Krink, T., Mittnik, S. and Paterlini, S., Differential evolution and combinatorial search for constrained index tracking. Ann. Oper. Res., 2009, 172(1), 153–176.
  • Mainik, G., Mitov, G. and Rüschendorf, L., Portfolio optimization for heavy-tailed assets: Extreme risk index vs. markowitz. J. Empir. Finance, 2015, 32(2), 115–134.
  • Malkiel, B.G., Returns from investing in equity mutual funds 1971 to 1991. J. Finance., 1995, 50(2), 549–572.
  • Rudolf, M., Wolter, H.-J. and Zimmermann, H., A linear model for tracking error minimization. J. Bank. Finance, 1999, 23(1), 85–103.
  • Santosa, F. and Symes, W.W., Linear inversion of band-limited reflection seismograms. SIAM J. Sci. Stat. Comput., 1986, 7(4), 1307–1330.
  • Sorenson, E., Miller, K. and Samak, V., Allocating between active and passive management. Financ. Anal. J., 1998, 54(5), 18–31.
  • Su, W. and Candès, E.J., SLOPE is adaptive to unknown sparsity and asymptotically minimax. Ann. Stat., 2016, 44(3), 1038–1068.
  • Tibshirani, R., Regression shrinkage and selection via the LASSO. R. Stat. Soc., 1996, 58(1), 267–288.
  • Weston, J., Elisseeff, A. and Schoelkopf, B., Use of the zero-norm with linear models and kernel methods. J. Mach. Learn. Res., 2003, 3, 1439–1461.
  • Xing, X., Hub, J. and Yang, Y., Robust minimum variance portfolio with ℓ∞ constraints. J. Bank. Finance, 2014, 46, 107–117.
  • Yen, Y.-M., Sparse weighted norm minimum variance portfolio. Rev. Financ., 2015, 20(3), 1259–1287.
  • Yen, Y.-M. and Yen, T.-J., Solving norm constrained portfolio optimization via coordinate-wise descent algorithms. Comput. Stat. Data Anal., 2014, 76(1), 737–759.

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