We consider the problem of estimating an unknown convex function f_* (0, 1)^d R from data (X1, Y1), (X_n; Y_n).A simple approach is finding a convex function that is the closest to the data points by minimizing the sum of squared errors over all convex functions. The convex regression estimator, which is computed this way, su ers from a drawback of having extremely large subgradients near the boundary of its domain. To remedy this situation, the penalized convex regression estimator, which minimizes the sum of squared errors plus the sum of squared norms of the subgradient over all convex functions, is recently proposed. In this paper, we prove that the penalized convex regression estimator and its subgradient converge with probability one to f_* and its subgradient, respectively, as n, and hence, establish the legitimacy of the penalized convex regression estimator.
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机译:我们考虑从数据(x1,y1),(xn; y_n).a简单的方法是找到最接近数据点的凸函数的问题,估计未知凸函数f_ *(0,1)^ d r通过最小化所有凸起函数的平方误差之和。凸回归估计器,以这种方式计算,Su ERS从其域边界附近具有极大的子分析器的缺点。为了解决这种情况,最近提出了惩罚的凸回归估计器,最小化平方误差和所有凸起函数的平方数量的平方规范之和。在本文中,我们证明了惩罚的凸起回归估计器及其子分析性分别与概率一到F_ *及其子辐射,作为n,因此确定了惩罚凸回归估计器的合法性。
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