Changepoint in Error-Prone Relations

Linear relations, containing measurement errors in input and output data, are considered. Parameters of these so-called errors-in-variables models can change at some unknown moment. The aim is to test whether such an unknown change has occurred or not. For instance, detecting a change in trend for a randomly spaced time series is a special case of the investigated framework. The designed changepoint tests are shown to be consistent and involve neither nuisance parameters nor tuning constants, which makes the testing procedures effortlessly applicable. A changepoint estimator is also introduced and its consistency is proved. A boundary issue is avoided, meaning that the changepoint can be detected when being close to the extremities of the observation regime. As a theoretical basis for the developed methods, a weak invariance principle for the smallest singular value of the data matrix is provided, assuming weakly dependent and non-stationary errors. The results are presented in a simulation study, which demonstrates computational efficiency of the techniques. The completely data-driven tests are illustrated through problems coming from calibration and insurance; however, the methodology can be applied to other areas such as clinical measurements, dietary assessment, computational psychometrics, or environmental toxicology as manifested in the paper.

[1]  Heung-Kyu Lee,et al.  Estimation of linear transformation by analyzing the periodicity of interpolation , 2014, Pattern Recognit. Lett..

[2]  M. Maciak,et al.  Changepoint Estimation for Dependent and Non-Stationary Panels , 2020 .

[3]  Piotr Kokoszka,et al.  Testing for changes in polynomial regression , 2008, 0810.4012.

[4]  R. C. Bradley Basic properties of strong mixing conditions. A survey and some open questions , 2005, math/0511078.

[5]  Y. Nakatsukasa Absolute and relative Weyl theorems for generalized eigenvalue problems , 2010 .

[6]  Geoffrey S. Watson,et al.  Estimation of a linear transformation , 1973 .

[7]  J. Vandewalle,et al.  Analysis and properties of the generalized total least squares problem AX≈B when some or all columns in A are subject to error , 1989 .

[8]  Unitarily invariant errors-in-variables estimation , 2016 .

[9]  M. Nussbaum Asymptotic optimality of estimators of a linear functional eeiation if the ratio of the error variances is known 2 , 1977 .

[10]  D. Altman,et al.  STATISTICAL METHODS FOR ASSESSING AGREEMENT BETWEEN TWO METHODS OF CLINICAL MEASUREMENT , 1986, The Lancet.

[11]  Conditional Least Squares and Copulae in Claims Reserving for a Single Line of Business , 2013, 1306.4529.

[12]  Strong law for mixing sequence , 1989 .

[13]  P. Hall,et al.  Bootstrap Confidence Regions for Functional Relationships in Errors-in- Variables Models , 1993 .

[14]  L. Stefanski Measurement Error Models , 2000 .

[15]  X. Shao,et al.  Testing for Change Points in Time Series , 2010 .

[16]  Nuisance-parameter-free changepoint detection in non-stationary series , 2018, TEST.

[17]  B. Miao,et al.  Inference on the change point estimator of variance in measurement error models* , 2016 .

[18]  Chi-Lun Cheng,et al.  On Estimating Linear Relationships When Both Variables Are Subject to Heteroscedastic Measurement Errors , 2006, Technometrics.

[19]  N. Herrndorf Stationary Strongly Mixing Sequences Not Satisfying the Central Limit Theorem , 1983 .

[20]  M. Pevsta,et al.  Modeling Dependencies in Claims Reserving with GEE , 2013, 1306.3768.

[21]  Mei Li,et al.  Dynamic risk assessment in healthcare based on Bayesian approach , 2019, Reliab. Eng. Syst. Saf..

[22]  M. Arbeláez,et al.  Prevalence of tuberculosis infection in healthcare workers of the public hospital network in Medellín, Colombia: a Bayesian approach , 2017, Epidemiology and Infection.

[23]  Variance Estimation Free Tests for Structural Changes in Regression , 2016 .

[24]  M. Pešta,et al.  Change Point Estimation in Panel Data without Boundary Issue , 2017 .

[25]  Wenzhi Yang,et al.  Asymptotic Approximations of Ratio Moments Based on Dependent Sequences , 2020, Mathematics.

[26]  David Wright,et al.  Forecasting Data Published at Irregular Time Intervals Using an Extension of Holt's Method , 1986 .

[27]  R J Carroll,et al.  Flexible Parametric Measurement Error Models , 1999, Biometrics.

[28]  Runze Li,et al.  Semiparametric regression for measurement error model with heteroscedastic error , 2019, J. Multivar. Anal..

[29]  Amir Dembo,et al.  Bounds on the extreme eigenvalues of positive-definite Toeplitz matrices , 1988, IEEE Trans. Inf. Theory.

[30]  Sabine Van Huffel,et al.  Estimation in a linear multivariate measurement error model with a change point in the data , 2007, Comput. Stat. Data Anal..

[31]  Christopher J. Zarowski,et al.  On lower bounds for the smallest eigenvalue of a Hermitian positive-definite matrix , 1995, IEEE Trans. Inf. Theory.

[32]  Christoff Gössl,et al.  Bayesian analysis of logistic regression with an unknown change point and covariate measurement error , 2001 .

[33]  Wenzhi Yang,et al.  The Consistency of the CUSUM-Type Estimator of the Change-Point and Its Application , 2020 .

[34]  J. Staudenmayer,et al.  Segmented Regression in the Presence of Covariate Measurement Error in Main Study/Validation Study Designs , 2002, Biometrics.

[35]  Matúš Maciak,et al.  Changepoint in dependent and non-stationary panels , 2020, Statistical Papers.

[36]  Michal Pesta Asymptotics for weakly dependent errors-in-variables , 2013, Kybernetika.

[37]  Lui Sha,et al.  A Mobile Geo-Communication Dataset for Physiology-Aware DASH in Rural Ambulance Transport , 2017, MMSys.

[38]  Michal Pešta,et al.  Block bootstrap for dependent errors-in-variables , 2017 .

[39]  M. Pešta,et al.  Asymptotic Consistency and Inconsistency of the Chain Ladder , 2012 .

[40]  R. Little,et al.  Regression analysis with covariates that have heteroscedastic measurement error , 2011, Statistics in medicine.

[41]  Michal Pesta,et al.  Structural breaks in dependent, heteroscedastic, and extremal panel data , 2018, Kybernetika.

[42]  M. Pešta Total least squares and bootstrapping with applications in calibration , 2013 .

[43]  Gene H. Golub,et al.  An analysis of the total least squares problem , 1980, Milestones in Matrix Computation.

[44]  L. Gleser Estimation in a Multivariate "Errors in Variables" Regression Model: Large Sample Results , 1981 .

[45]  Lajos Horváth,et al.  Detecting Changes in Linear Regressions , 1995 .

[46]  M. Pešta Strongly consistent estimation in dependent errors-in-variables , 2011 .

[47]  Paul P. Gallo Consistency of regression estimates when some variables are subject to error , 1982 .

[48]  Frederic M. Lord,et al.  Testing if two measuring procedures measure the same dimension. , 1973 .

[49]  G. Urga,et al.  Testing for instability in covariance structures , 2018 .

[50]  Yi-Ping Chang,et al.  Inferences for the Linear Errors-in-Variables with Changepoint Models , 1997 .