Robust international portfolio optimization with worst-case mean-CVaR

Fei Luan, Wei-guo Zhang, Yongjun Liu
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引用次数: 5

Abstract

This paper proposes a robust international portfolio optimization model with the consideration of worst-case lower partial moment (LPM) and worst-case mean return. In our model, we assume that the distributions and the first- and second-order moments of distributions of returns of assets and exchange rates are all ambiguous. The proposed model can be reformulated into an equivalent semidefinite programming (SDP) problem, which is computationally tractable. For investigation of the performance of our model, we also give two benchmark models. The first benchmark model is a scenario-based model which uses historical observations of returns to approximate the future distributions. The second benchmark model only considers the ambiguity of distributions but does not consider the ambiguity of the first- and second-order moments of distributions. We conduct empirical experiments in a rolling forward way to evaluate the out-of-sample performances of our proposed model, the two benchmark models, and an equally weighted model using the return measures and various risk-adjusted return measures. The result shows that our model has the best performance. It verifies that investors can obtain benefits when employing the robust model and considering the ambiguity of the first- and second-order moments of distributions.
具有最坏情况均值cvar的稳健国际投资组合优化
本文提出了考虑最坏情况下偏矩和最坏情况平均收益的稳健国际投资组合优化模型。在我们的模型中,我们假设资产收益和汇率的分布及其一阶矩和二阶矩都是模糊的。该模型可转化为等效半定规划(SDP)问题,在计算上易于处理。为了考察模型的性能,我们还给出了两个基准模型。第一个基准模型是基于场景的模型,它使用历史回报观察来近似未来的分布。第二个基准模型只考虑了分布的模糊性,而没有考虑分布的一阶矩和二阶矩的模糊性。我们以滚动前向的方式进行了实证实验,以评估我们提出的模型、两个基准模型以及使用收益度量和各种风险调整收益度量的等加权模型的样本外性能。结果表明,该模型具有最佳的性能。验证了采用鲁棒模型并考虑分布一阶矩和二阶矩的模糊性时,投资者可以获得收益。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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