D. V. Hinkley

Bio: D. V. Hinkley is an academic researcher from Stanford University. The author has contributed to research in topics: Sampling distribution & Asymptotic distribution. The author has an hindex of 8, co-authored 13 publications receiving 1842 citations.

Conditional inference about a normal mean with known coefficient of variation

Abstract: SUMMARY For a random sample from the normal distribution with known coefficient of variation, the minimal sufficient statistic includes an ancillary statistic. The effects of conditioning on the ancillary statistic are discussed and related to a recommendation of R. A. Fisher concerning use of the observed second derivative of the log likelihood function in normal approximations.

Problems and solutions in theoretical statistics

Abstract: 1. Introduction.- Summary.- 2. Some general concepts.- Summary.- Problems and solutions.- 3. Pure significance tests.- Summary.- Problems and solutions.- 4. Significance tests: simple null hypotheses.- Summary.- Problems and solutions.- 5. Significance tests: composite null hypotheses.- Summary.- Problems and solutions.- 6. Distribution-free and randomization tests.- Summary.- Problems and solutions.- 7. Interval estimation.- Summary.- Problems and solutions.- 8. Point estimation.- Summary.- Problems and solutions.- 9. Asymptotic theory.- Summary.- Problems and solutions.- 10. Bayesian methods.- Summary.- Problems and solutions.- 11. Decision theory.- Summary.- Problems and solutions.- References.- Author Index.

Tests for Parameter Instability and Structural Change with Unknown Change Point.

Abstract: This paper considers tests for parameter instability and structural change with unknown change point. The results apply to a wide class of parametric models that are suitable for estimation by generalized method of moments procedures. The asymptotic distributions of the test statistics considered here are nonstandard because the change point parameter only appears under the alternative hypothesis and not under the null. The tests considered here are shown to have nontrivial asymptotic local power against all alternatives for which the parameters are nonconstant. The tests are found to perform quite well in a Monte Carlo experiment reported elsewhere. Copyright 1993 by The Econometric Society.

Techniques for Testing the Constancy of Regression Relationships Over Time

Abstract: Methods for studying the stability over time of regression relationships are considered. Recursive residuals, defined to be uncorrelated with zero means and constant variance, are introduced and tests based on the cusum and cusum of squares of recursive residuals are developed. Further techniques based on moving regressions, in which the regression model is fitted from a segment of data which is moved along the series, and on regression models whose coefficients are polynomials in time are studied. The Quandt log-likelihood ratio statistic is considered. Emphasis is placed on the use of graphical methods. The techniques proposed have been embodied in a comprehensive computer program, TIMVAR. Use of the techniques is illustrated by applying them to three sets of data.

Permutation tests for joinpoint regression with applications to cancer rates

Abstract: The identification of changes in the recent trend is an important issue in the analysis of cancer mortality and incidence data. We apply a joinpoint regression model to describe such continuous changes and use the grid-search method to fit the regression function with unknown joinpoints assuming constant variance and uncorrelated errors. We find the number of significant joinpoints by performing several permutation tests, each of which has a correct significance level asymptotically. Each p-value is found using Monte Carlo methods, and the overall asymptotic significance level is maintained through a Bonferroni correction. These tests are extended to the situation with non-constant variance to handle rates with Poisson variation and possibly autocorrelated errors. The performance of these tests are studied via simulations and the tests are applied to U.S. prostate cancer incidence and mortality rates.

Detection of abrupt changes: theory and application

Abstract: This book is downloadable from http://www.irisa.fr/sisthem/kniga/. Many monitoring problems can be stated as the problem of detecting a change in the parameters of a static or dynamic stochastic system. The main goal of this book is to describe a unified framework for the design and the performance analysis of the algorithms for solving these change detection problems. Also the book contains the key mathematical background necessary for this purpose. Finally links with the analytical redundancy approach to fault detection in linear systems are established. We call abrupt change any change in the parameters of the system that occurs either instantaneously or at least very fast with respect to the sampling period of the measurements. Abrupt changes by no means refer to changes with large magnitude; on the contrary, in most applications the main problem is to detect small changes. Moreover, in some applications, the early warning of small - and not necessarily fast - changes is of crucial interest in order to avoid the economic or even catastrophic consequences that can result from an accumulation of such small changes. For example, small faults arising in the sensors of a navigation system can result, through the underlying integration, in serious errors in the estimated position of the plane. Another example is the early warning of small deviations from the normal operating conditions of an industrial process. The early detection of slight changes in the state of the process allows to plan in a more adequate manner the periods during which the process should be inspected and possibly repaired, and thus to reduce the exploitation costs.

Bias reduction of maximum likelihood estimates

Abstract: SUMMARY It is shown how, in regular parametric problems, the first-order term is removed from the asymptotic bias of maximum likelihood estimates by a suitable modification of the score function. In exponential families with canonical parameterization the effect is to penalize the likelihood by the Jeffreys invariant prior. In binomial logistic models, Poisson log linear models and certain other generalized linear models, the Jeffreys prior penalty function can be imposed in standard regression software using a scheme of iterative adjustments to the data.