This article considers the problem of multi-group classification in the setting where the number of variables $p$ is larger than the number of observations $n$. Several methods have been proposed in the literature that address this problem, however their variable selection performance is either unknown or suboptimal to the results known in the two-group case. In this work we provide sharp conditions for the consistent recovery of relevant variables in the multi-group case using the discriminant analysis proposal of Gaynanova et al. [7]. We achieve the rates of convergence that attain the optimal scaling of the sample size $n$, number of variables $p$ and the sparsity level $s$. These rates are significantly faster than the best known results in the multi-group case. Moreover, they coincide with the minimax optimal rates for the two-group case. We validate our theoretical results with numerical analysis.
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机译:本文考虑在变量$ p $的数量大于观察值$ n $的情况下的多组分类问题。在文献中已经提出了几种解决该问题的方法,但是它们的变量选择性能相对于两组情况下已知的结果是未知的或次优的。在这项工作中,我们使用Gaynanova等人的判别分析建议为在多组案例中一致恢复相关变量提供了清晰的条件。 [7]。我们实现了收敛速度,该收敛速度实现了样本量$ n $,变量数量$ p $和稀疏度$ s $的最佳缩放。在多组情况下,这些速率明显快于最著名的结果。而且,它们与两组情况的最小最大最优速率一致。我们通过数值分析验证了我们的理论结果。
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