We consider the median regression model X{sub}k = θ(x{sub}k) + §{sub}k, where the unknown signal θ : [0, 1] → R, is assumed to belong to a Holder smoothness class, the §{sub}ks are independent, but not necessarily identically distributed, noises with zero median. The distribution of the noise is assumed to be unknown and satisfying some weak conditions. Possible noise distributions may have heavy tails, so that, for example, the expectation of noises does not exist. This implies that in general linear methods (for example, kernel method) cannot be applied directly in this situation. On the basis of a preliminary recursive estimator, we construct certain variables Y{sub}ks, called pseudovalues which do not depend on the noise distribution, and derive an asymptotic expansion (uniform over a certain class of noise distributions): Y{sub}k = θ(x{sub}k) + ε{sub}k + r{sub}k, where ε{sub}ks are binary random variables and the remainder terms r{sub}ks are negligible. This expansion mimics the nonparametric regression model with binary noises. In so doing, we reduce our original observation model with "bad" (heavy-tailed) noises effectively to the nonparametric regression model with binary noises.
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机译:我们考虑中位数回归模型X {sub} k =θ(x {sub} k)+§{sub} k,其中未知信号θ:[0,1]→R被假定为Holder平滑度类,则{{sub} ks是独立的,但不一定是分布相同的噪声,中间值为零。假定噪声的分布是未知的,并且满足一些弱条件。可能的噪声分布可能有很重的尾巴,因此,例如,不存在对噪声的期望。这意味着一般线性方法(例如核方法)在这种情况下不能直接应用。在初步的递归估计量的基础上,我们构造了某些变量Y {sub} ks(称为伪值),它们不依赖于噪声分布,并得出了渐近展开式(在特定类别的噪声分布上均匀):Y {sub} k =θ(x {sub} k)+ε{sub} k + r {sub} k,其中ε{sub} ks是二进制随机变量,其余项r {sub} ks可以忽略。这种扩展模仿了带有二进制噪声的非参数回归模型。这样,我们将具有“坏”(重尾)噪声的原始观测模型有效地减少为具有二进制噪声的非参数回归模型。
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