Finite Sample Smeariness (FSS) has been recently discovered. It means that the distribution of sample Fr\'echet means of underlying rather unsuspicious random variables can behave as if it were smeary for quite large regimes of finite sample sizes. In effect classical quantile-based statistical testing procedures do not preserve nominal size, they reject too often under the null hypothesis. Suitably designed bootstrap tests, however, amend for FSS. On the circle it has been known that arbitrarily sized FSS is possible, and that all distributions with a nonvanishing density feature FSS. These results are extended to spheres of arbitrary dimension. In particular all rotationally symmetric distributions, not necessarily supported on the entire sphere feature FSS of Type I. While on the circle there is also FSS of Type II it is conjectured that this is not possible on higher-dimensional spheres.
翻译:最近才发现Fr\'echet样本中非常不可疑的随机变量的分布方式,这表示Fr\'echet样本的分布方式可能表现为对相当大的有限样本大小的系统来说是抹黑的。实际上,传统的基于孔的统计测试程序并不保持名义大小,但往往在无效假设下拒绝。但是,为FSS进行设计得当的靴套测试。在圆圈上,人们知道任意规模的FSS是可能的,并且所有分布都具有非损耗性密度特征。这些结果扩展到了任意的方面。特别是所有旋转式的对称分布,不一定支持第一类FSS的整个领域特征。虽然在圆圈上也有二类FSS,但推断说,在较高维度的球体上不可能做到这一点。
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