LINEAR ESTIMATORS IN CHANGE-POINT PROBLEMS
成果类型:
Article
署名作者:
HARTIGAN, JA
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1176325497
发表日期:
1994
页码:
824-834
关键词:
regression
摘要:
Observations X(i) are uncorrelated with means theta(i), i = 1,...,n, and variances 1. The linear estimators theta = TX, for some n x n matrix T, are widely used in smoothing problems, where it is assumed that neighbouring parameter Values are similar The smoothness assumption is violated in change point problems, where neighbouring parameter values are equal, except at some unspecified change points where there are jumps of unknown size from one parameter value to the next. In the case of a single change point in one dimension, for any linear estimator, the expected sum of squared errors between estimates and parameters is of order root n for some choice of parameters, compared to order 1 for the least squares estimate. We show similar results for adaptive shift estimators, in which the linear estimator uses a kernel estimated from the data. Finally, for a change point problem in two dimensions, the expected sum of squared errors is of order n3/4.