Understanding multivariate dependencies in both the bulk and the tails of a distribution is an important problem for many applications, such as ensuring algorithms are robust to observations that are infrequent but have devastating effects. Archimax copulas are a family of distributions endowed with a precise representation that allows simultaneous modeling of the bulk and the tails of a distribution. Rather than separating the two as is typically done in practice, incorporating additional information from the bulk may improve inference of the tails, where observations are limited. Building on the stochastic representation of Archimax copulas, we develop a non-parametric inference method and sampling algorithm. Our proposed methods, to the best of our knowledge, are the first that allow for highly flexible and scalable inference and sampling algorithms, enabling the increased use of Archimax copulas in practical settings. We experimentally compare to state-of-the-art density modeling techniques, and the results suggest that the proposed method effectively extrapolates to the tails while scaling to higher dimensional data. Our findings suggest that the proposed algorithms can be used in a variety of applications where understanding the interplay between the bulk and the tails of a distribution is necessary, such as healthcare and safety.
翻译:分布物的散装和尾部的多重理解依赖性是许多应用中的一个重要问题,例如确保算法对不常见但具有破坏性影响的观测具有强力,例如,确保算法对不常见的观测具有强力,但具有破坏性效果。Archimax 相形形色形形形色的分布式组合,具有精确的分布式,能够同时模拟散装物和分布物尾部的模型。不象实践中通常的做法那样将两者分开,吸收散装物和尾部的额外信息可以改善观察有限的尾部的推断力。在Archimax 相形色色色的表达法的基础上,我们开发了一种非参数推断法和取样算法。我们所建议的方法在我们的知识中是第一个允许高度灵活和可缩放的运算法和抽样算法的组合。我们实验性地比较了大宗形色色相色色色的模型技术,结果表明,拟议的方法有效地推断尾部为外推,同时缩为更高维度的数据。我们的研究结果表明,拟议的算法可以用来进行各种必要的安全性分配,而必要的尾部的分布是了解,而必要的散和尾部之间的相互作用。