Fast multiple change-point segmentation methods, which additionally provide faithful statistical statements on the number, locations and sizes of the segments, have recently received great attention. In this paper, we propose a multiscale segmentation method, FDRSeg, which controls the false discovery rate (FDR) in the sense that the number of false jumps is bounded linearly by the number of true jumps. In this way, it adapts the detection power to the number of true jumps. We prove a non-asymptotic upper bound for its FDR in a Gaussian setting, which allows to calibrate the only parameter of FDRSeg properly. Moreover, we show that FDRSeg estimates change-point locations, as well as the signal, in a uniform sense at optimal minimax convergence rates up to a log-factor. The latter is w.r.t. $L^{p}$-risk, $pge 1$, over classes of step functions with bounded jump sizes and either bounded, or even increasing, number of change-points. FDRSeg can be efficiently computed by an accelerated dynamic program; its computational complexity is shown to be linear in the number of observations when there are many change-points. The performance of the proposed method is examined by comparisons with some state of the art methods on both simulated and real datasets. An R-package is available online.
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机译:快速的多变化点分割方法,最近还提供了有关段的数量,位置和大小的忠实统计报表,最近受到了极大的关注。在本文中,我们提出了一种多尺度分割方法FDRSeg,该方法可以控制误发现率(FDR),即误跳数与实际跳数成线性关系。通过这种方式,它使检测能力适应真实跳跃的次数。我们在高斯环境中证明了其FDR的非渐近上限,从而可以正确校准FDRSeg的唯一参数。此外,我们表明FDRSeg在统一的意义上以最佳对数因数的最佳最小最大收敛速率估算变化点位置以及信号。后者是w.r.t. $ L ^ {p} $-风险,$ p ge 1 $,跨步函数类,其跳变大小有界,或者变化点有界,甚至增加。 FDRSeg可以通过加速的动态程序进行有效计算;当变化点很多时,它的计算复杂度在观察数量上是线性的。通过与模拟数据集和实际数据集上的一些现有方法进行比较,来检验所提出方法的性能。 R包可在线获得。
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