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Abstract:
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We consider the problem of segmented linear regression with the focus on estimating of the location of the break-point(s). Let n be the sample size, we show that the global minimax convergence rate for this problem in terms of the mean absolute error is O(n^{-1/3}). On the other hand, we demonstrate the construction of a super-efficient estimator that achieves the pointwise convergence rate of either O(n^{-1}) or O(n^{-1/2}) for every fixed parameter values, depending on whether the structural change is a jump or a kink. We discuss the implications and the potential remedy. We then illustrate this phenomenon in the multivariate and high-dimensional settings, and extend our results to segmented polynomial regression models.
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