Spectral risk objectives - also called $L$-risks - allow for learning systems to interpolate between optimizing average-case performance (as in empirical risk minimization) and worst-case performance on a task. We develop stochastic algorithms to optimize these quantities by characterizing their subdifferential and addressing challenges such as biasedness of subgradient estimates and non-smoothness of the objective. We show theoretically and experimentally that out-of-the-box approaches such as stochastic subgradient and dual averaging are hindered by bias and that our approach outperforms them.
翻译:光谱风险目标 — — 也称为美元风险 — — 允许学习系统在优化平均业绩(如最大限度地减少实验风险)和任务中最坏业绩之间进行内插。 我们开发了随机算法,以优化这些数量,具体化其次偏差特征,并应对诸如次偏差估计偏差和目标非移动性等挑战。 我们从理论上和实验性地表明,偏差和我们的方法优于偏差,从而阻碍了箱外方法(如随机次等级和双等)的形成。
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