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引用次数: 0
摘要
张量特征向量自然地将矩阵特征向量概括为多向阵列:阶数为 k、维数为 p 的对称张量的特征向量是单位球上 p 个变量中 k 阶多项式的静止点。对称张量的主特征向量最大化了单位球上多个变量的多项式,而基特征向量则是多个变量的多项式的根。本文重点研究基于偏度的投影追寻和三阶张量特征向量,它们提供了张量特征向量和投影追寻之间最简单但又相关的联系。基于偏度的投影追寻使用样本三阶标准化累积的主导特征向量来最大化偏度,从而找到有趣的数据投影。基于偏度的投影追寻还使用样本第三累计量的基特征向量来消除偏度,便于寻找偏度以外的有趣数据特征。我们对有关张量特征向量和投影追寻的文献有两方面的贡献。首先,我们展示了基于偏度的投影追寻如何有助于顺序聚类检测。其次,我们展示了关于样本第三积的显性和基张量特征向量的一些渐近结果。我们用六个著名的数据集评估了这些理论结果的实用性。
Tensor eigenvectors naturally generalize matrix eigenvectors to multi-way arrays: eigenvectors of symmetric tensors of order k and dimension p are stationary points of polynomials of degree k in p variables on the unit sphere. Dominant eigenvectors of symmetric tensors maximize polynomials in several variables on the unit sphere, while base eigenvectors are roots of polynomials in several variables. In this paper, we focus on skewness-based projection pursuit and on third-order tensor eigenvectors, which provide the simplest, yet relevant connections between tensor eigenvectors and projection pursuit. Skewness-based projection pursuit finds interesting data projections using the dominant eigenvector of the sample third standardized cumulant to maximize skewness. Skewness-based projection pursuit also uses base eigenvectors of the sample third cumulant to remove skewness and facilitate the search for interesting data features other than skewness. Our contribution to the literature on tensor eigenvectors and on projection pursuit is twofold. Firstly, we show how skewness-based projection pursuit might be helpful in sequential cluster detection. Secondly, we show some asymptotic results regarding both dominant and base tensor eigenvectors of sample third cumulants. The practical relevance of the theoretical results is assessed with six well-known data sets.
期刊介绍:
TEST is an international journal of Statistics and Probability, sponsored by the Spanish Society of Statistics and Operations Research. English is the official language of the journal.
The emphasis of TEST is placed on papers containing original theoretical contributions of direct or potential value in applications. In this respect, the methodological contents are considered to be crucial for the papers published in TEST, but the practical implications of the methodological aspects are also relevant. Original sound manuscripts on either well-established or emerging areas in the scope of the journal are welcome.
One volume is published annually in four issues. In addition to the regular contributions, each issue of TEST contains an invited paper from a world-wide recognized outstanding statistician on an up-to-date challenging topic, including discussions.