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Sparse Index Tracking With K-Sparsity or ϵ-Deviation Constraint via ℓ 0 -Norm Minimization.

Authors :
Li XP
Shi ZL
Leung CS
So HC
Source :
IEEE transactions on neural networks and learning systems [IEEE Trans Neural Netw Learn Syst] 2023 Dec; Vol. 34 (12), pp. 10930-10943. Date of Electronic Publication: 2023 Nov 30.
Publication Year :
2023

Abstract

Sparse index tracking, as one of the passive investment strategies, is to track a benchmark financial index via constructing a portfolio with a few assets in a market index. It can be considered as parameter learning in an adaptive system, in which we periodically update the selected assets and their investment percentages based on the sliding window approach. However, many existing algorithms for sparse index tracking cannot explicitly and directly control the number of assets or the tracking error. This article formulates sparse index tracking as two constrained optimization problems and then proposes two algorithms, namely, nonnegative orthogonal matching pursuit with projected gradient descent (NNOMP-PGD) and alternating direction method of multipliers for l <subscript>0</subscript> -norm (ADMM- l <subscript>0</subscript> ). The NNOMP-PGD aims at minimizing the tracking error subject to the number of selected assets less than or equal to a predefined number. With the NNOMP-PGD, investors can directly and explicitly control the number of selected assets. The ADMM- l <subscript>0</subscript> aims at minimizing the number of selected assets subject to the tracking error that is upper bounded by a preset threshold. It can directly and explicitly control the tracking error. The convergence of the two proposed algorithms is also presented. With our algorithms, investors can explicitly and directly control the number of selected assets or the tracking error of the resultant portfolio. In addition, numerical experiments demonstrate that the proposed algorithms outperform the existing approaches.

Details

Language :
English
ISSN :
2162-2388
Volume :
34
Issue :
12
Database :
MEDLINE
Journal :
IEEE transactions on neural networks and learning systems
Publication Type :
Academic Journal
Accession number :
35576417
Full Text :
https://doi.org/10.1109/TNNLS.2022.3171819