ON THE BEHRENS-FISHER PROBLEM: A GLOBALLY CONVERGENT ALGORITHM AND A FINITE-SAMPLE STUDY OF THE WALD, LR AND LM TESTS
成果类型:
Article
署名作者:
Bellon, Alexandre; Didier, Gustavo
署名单位:
Duke University; Tulane University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/07-AOS528
发表日期:
2008
页码:
2377-2408
关键词:
linear-regression model
CONFLICT
criteria
hypotheses
variances
freedom
摘要:
In this paper we provide a provably convergent algorithm for the multi-variate Gaussian Maximum Likelihood version of the Behrens-Fisher Problem. Our work builds upon a formulation of the log-likelihood function proposed by Buot and Richards [5]. Instead of focusing on the first order optimality conditions, the algorithm aims directly for the maximization of the log-likelihood function itself to achieve a global solution. Convergence proof and complexity estimates are provided for the algorithm. Computational experiments illustrate the applicability of such methods to high-dimensional data. We also discuss how to extend the proposed methodology to a broader class of problems. We establish a systematic algebraic relation between the Wald, Likelihood Ratio and Lagrangian Multiplier Test (W >= LR >= LM) in the context of the Behrens-Fisher Problem. Moreover, we use our algorithm to computationally investigate the finite-sample size and power of the Wald, Likelihood Ratio and Lagrange Multiplier Tests, which previously were only available through asymptotic results. The methods developed here are applicable to much higher dimensional settings than the ones available in the literature. This allows us to better capture the role of high dimensionality oil the actual size and power of the tests for finite samples.