参数随时间恒定性的检验

Testing for the Constancy of Parameters Over Time

Journal of the American Statistical Association · 1989
被引 208
ABS 4

中文导读

提出检验参数是否随时间变化的统计方法,假设参数变化服从鞅过程,利用得分函数的累积和构造检验统计量,并推导其极限分布。

Abstract

Abstract Tests are proposed for detecting possible changes in parameters when the observations are obtained sequentially in time. While deriving the tests the alternative one has in mind specifies the parameter process as a martingale. The distribution theory of these tests relies on the large-sample results; that is, only the limiting null distributions are known (except in very special cases). The main tool in establishing these limiting distributions is weak convergence of stochastic processes. Suppose that we have vector-valued observations x 1, …, x n obtained sequentially in time (or ordered in some other linear fashion). Their joint distribution is described by determining the initial distribution for x 1 and the conditional distribution for each x k given the past up to x k–1. Suppose further that these distributions depend on a p-dimensional parameter vector θ. At least locally (i.e., in a short time period) this may be more or less legitimate. In the long run, however, the possibility of some changes in the observation-generating process should be taken into account. Specifically, it is assumed here that those changes occur through a parameter variation in the form of a martingale. The martingale specification has an advantage of covering several types of departure of constancy: for example, a single jump at an unknown time point (the so-called change-point model) or slow random variation (typically random walk). The tests are derived by first finding the locally most powerful test against a martingale-type alternative when the starting value of the parameter process is known. After some simplification a test having a known numerically tractable limiting distribution is developed. When the starting point is unknown an efficient estimate is substituted for it. In addition, the corresponding limiting distribution is established. The proposed tests turn out to be based on cumulative sums of the score function (the derivative of the log-likelihood).

统计学时间序列分析计量经济学随机过程