高斯收益的最优动态策略

IF 0.1 Q4 BUSINESS, FINANCE Journal of Investment Strategies Pub Date : 2018-07-17 DOI:10.2139/ssrn.3385639
Nikan B. Firoozye, Adriano Soares Koshiyama
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引用次数: 2

摘要

动态交易策略,本着趋势追随或均值回归的精神,代表了现代金融中一个仅被部分理解、但有利可图且普遍存在的领域。假设高斯收益和高斯动态权重或信号,(例如,过去收益的线性过滤器,如简单移动平均线,指数加权移动平均线,ARIMA模型的预测),我们能够根据随机信号和未知未来收益之间的相关性,推导出策略收益的前四个时刻的封闭形式表达式。通过允许资产配置中的随机性和对策略权重与收益的相互作用进行建模,我们证明了正偏度和超额峰度是所有正夏普动态策略的基本组成部分,这通常是经验观察到的;证明总最小二乘(TLS)或正交最小二乘比OLS更适合最大化夏普比率,而典型相关分析(CCA)同样适用于多资产情况;得出夏普比率的标准误差,该标准误差比常用的标准误差更严格;并推导出策略的偏度和峰度的标准误差,显然是新的结果。我们证明了这些结果渐近地适用于大范围的平稳时间序列。
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Optimal Dynamic Strategies on Gaussian Returns
Dynamic trading strategies, in the spirit of trend-following or mean-reversion, represent an only partly understood but lucrative and pervasive area of modern finance. Assuming Gaussian returns and Gaussian dynamic weights or signals, (e.g., linear filters of past returns, such as simple moving averages, exponential weighted moving averages, forecasts from ARIMA models), we are able to derive closed-form expressions for the first four moments of the strategy's returns, in terms of correlations between the random signals and unknown future returns. By allowing for randomness in the asset-allocation and modelling the interaction of strategy weights with returns, we demonstrate that positive skewness and excess kurtosis are essential components of all positive Sharpe dynamic strategies, which is generally observed empirically; demonstrate that total least squares (TLS) or orthogonal least squares is more appropriate than OLS for maximizing the Sharpe ratio, while canonical correlation analysis (CCA) is similarly appropriate for the multi-asset case; derive standard errors on Sharpe ratios which are tighter than the commonly used standard errors from Lo; and derive standard errors on the skewness and kurtosis of strategies, apparently new results. We demonstrate these results are applicable asymptotically for a wide range of stationary time-series.
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来源期刊
CiteScore
0.40
自引率
50.00%
发文量
7
期刊最新文献
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