In this article we present a new class of robust regression estimators. Our main example will be called the least trimmed median estimator (LTM). It is based on the minimization of the objective function 1/h(p) Sigma(k=1)(hp) {median(j) (i)(beta) - r(j)(beta)}((k)) where h(p) = [1/2(n + p + 1)] and the subscript (k) indicates the kth order statistic. It can be seen as an alternative to the least median of squares (LMS) and the least trimmed squares (LTS) estimators, which correspond to minimizing the objective functions ((hp)) and Sigma(k=1)(hp)r((k))(2). An important advantage of the LTM is that it is not geared towards symmetric error distributions, which makes it more generally applicable. We will see that the LTM has the same breakdown point as the LMS and the LTS, but that its gaussian efficiency is higher. We will also show that the LTM has a much better bias curve than the LTS, and that its computation is virtually the same. The LTM is illustrated on a real data set about concentrations of plutonium isotopes.
展开▼
机译:在本文中,我们提出了一类新的鲁棒回归估计量。我们的主要示例称为最小修整中位数估算器(LTM)。它基于最小目标函数1 / h(p)Sigma(k = 1)(hp){中位数(j) r(i)β-r(j)β}(( k)),其中h(p)= [1/2(n + p + 1)],下标(k)表示第k阶统计量。可以看作是最小二乘方中位数(LMS)和最小修整平方(LTS)估计量的替代方法,它们对应于最小化目标函数 r ((hp))和Sigma(k = 1)(hp )r((k))(2)。 LTM的一个重要优点是它不适合对称误差分布,这使其更通用。我们将看到LTM与LMS和LTS具有相同的击穿点,但是其高斯效率更高。我们还将显示LTM的偏差曲线比LTS好得多,并且其计算量实际上是相同的。在有关about同位素浓度的真实数据集上显示了LTM。
展开▼
