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  1. Free, publicly-accessible full text available August 14, 2025
  2. Free, publicly-accessible full text available August 11, 2025
  3. Free, publicly-accessible full text available August 11, 2025
  4. Rosen, D (Ed.)
    This paper proposes a new test for a change point in the mean of high-dimensional data based on the spatial sign and self-normalization. The test is easy to implement with no tuning parameters, robust to heavy-tailedness and theoretically justified with both fixed-and sequential asymptotics under both null and alternatives, where n is the sample size. We demonstrate that the fixed-n asymptotics provide a better approximation to the finite sample distribution and thus should be preferred in both testing and testing-based estimation. To estimate the number and locations when multiple change-points are present, we propose to combine the p-value under the fixed-n asymptotics with the seeded binary segmentation (SBS) algorithm. Through numerical experiments, we show that the spatial sign based procedures are robust with respect to the heavy-tailedness and strong coordinate-wise dependence, whereas their non-robust counterparts proposed in Wang et al. (2022) [28] appear to under-perform. A real data example is also provided to illustrate the robustness and broad applicability of the proposed test and its corresponding estimation algorithm. 
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  5. Chen, X. ; Todorov, V. (Ed.)
  6. Delaigle, A ; Lauritzen, S. ; Yao, Q. (Ed.)
  7. Delaigle, A. ; Lauritzen, S. ; Yao, Q. (Ed.)
  8. null (Ed.)