二次判别函数渐近逼近的可计算误差界

Pub Date : 2020-11-01 DOI:10.32917/hmj/1607396491

Y. Fujikoshi

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引用次数: 1

摘要

摘要。本文研究了二次判别函数Q的期望误分类概率（EPMC）的渐近近似的可计算误差界。作为包括线性和二次判别函数的一般判别函数的特例，给出了Q的位置和尺度混合表达式。利用该结果，当样本量和维数都很大时，我们为Q的EPMC的渐近近似提供了可计算的误差界。对边界进行了数值探索。当协方差矩阵已知时，对于二次判别函数Q 0给出了类似的结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Computable error bounds for asymptotic approximations of the quadratic discriminant function

A bstract . This paper is concerned with computable error bounds for asymptotic approximations of the expected probabilities of misclassiﬁcation (EPMC) of the quadratic discriminant function Q . A location and scale mixture expression for Q is given as a special case of a general discriminant function including the linear and quadratic discriminant functions. Using the result, we provide computable error bounds for asymptotic approximations of the EPMC of Q when both the sample size and the dimensionality are large. The bounds are numerically explored. Similar results are given for a quadratic discriminant function Q 0 when the covariance matrix is known.

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