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Nonparametric sharpe ratio function estimation in heteroscedastic regression models via convex optimization
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- Authors
- Issue Date
- 2018-01
- Publisher
- PMLR
- Citation
- International Conference on Artificial Intelligence and Statistics, AISTATS 2018, Vol.84, pp.1495-1504
- Abstract
- Copyright 2018 by the author(s).We consider maximum likelihood estimation (MLE) of heteroscedastic regression models based on a new parametrization of the likelihood in terms of the Sharpe ratio function, or the ratio of the mean and volatility functions. While with a standard parametrization the MLE problem is not convex and hence hard to solve globally, our parametrization leads to a functional that is jointly convex in the Sharpe ratio and inverse volatility functions. The major difficulty with the resulting infinite-dimensional convex program is the shape constraint on the inverse volatility function. We propose to solve the problem by solving a sequence of finite-dimensional convex programs with increasing dimensions, which can be done globally and efficiently. We demonstrate that, when the goal is to estimate the Sharpe ratio function directly, the finite-sample performance of the proposed estimation method is superior to existing methods that estimate the mean and variance functions separately. When applied to a financial dataset, our method captures a well-known covariate-dependent effect on the Shape ratio.
- ISSN
- 2640-3498
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