Statistical Hypothesis Testing Under Interval Uncertainty: An Overview

An important part of statistical data analysis is hypothesis testing. For example, we know the probability distribution of the characteristics corresponding to a certain disease, we have the values of the characteristics describing a patient, and we must make a conclusion whether this patient has this disease. Traditional hypothesis testing techniques are based on the assumption that we know the exact values of the characteristic(s) x describing a patient. In practice, the value x comes from measurements and is, thus, only known with uncertainty: x 6 x. In many practical situations, we only know the upper bound ¢ on the (absolute value of the) measurement error ¢x def = x i x. In such situation, after the measurement, the only information that we have about the (unknown) value x of this characteristic is that x belongs to the interval [x i ¢; x + ¢]. In this paper, we overview difierent approaches on how to test a hypothesis under such interval uncertainty. This overview is based on a general approach to decision making under interval uncertainty, approach developed by the 2007 Nobelist L. Hurwicz.

[1]  Maliha S. Nash,et al.  Handbook of Parametric and Nonparametric Statistical Procedures , 2001, Technometrics.

[2]  Semyon G. Rabinovich,et al.  Measurement Errors and Uncertainties: Theory and Practice , 1999 .

[3]  H. Brachinger,et al.  Decision analysis , 1997 .

[4]  I. Neumann,et al.  Congruence tests and outlier detection in deformation analysis with respect to observation imprecision , 2007 .

[5]  Raymond J. Carroll,et al.  Measurement error in nonlinear models: a modern perspective , 2006 .

[6]  T. Stroud Comparing regressions when measurement error variances are known , 1974 .

[7]  Hung T. Nguyen,et al.  An Introduction to Random Sets , 2006 .

[8]  Ingo Neumann,et al.  Multidimensional Statistical Tests for Imprecise Data , 2008 .

[9]  Thierry Denoeux,et al.  Nonparametric rank-based statistics and significance tests for fuzzy data , 2005, Fuzzy Sets Syst..

[10]  Thomas Augustin,et al.  Neyman–Pearson testing under interval probability by globally least favorable pairs: Reviewing Huber–Strassen theory and extending it to general interval probability , 2002 .

[11]  Dan A. Ralescu,et al.  Overview on the development of fuzzy random variables , 2006, Fuzzy Sets Syst..

[12]  H. Raiffa,et al.  Decisions with Multiple Objectives , 1993 .

[13]  I. Neumann,et al.  Outlier Detection in Geodetic Applications with respect to Observation Imprecision , 2006 .

[14]  S. Vajda,et al.  GAMES AND DECISIONS; INTRODUCTION AND CRITICAL SURVEY. , 1958 .

[15]  María Angeles Gil,et al.  The fuzzy approach to statistical analysis , 2006, Comput. Stat. Data Anal..