References
- Bacon , D. W. , Watts , D. G. ( 1971 ). Estimating the transition between two intersecting straight lines . Biometrika 58 : 525 – 534 .
- Balke , N. S. ( 1993 ). Detecting level shifts in time series . Journal of Busi. Econ. Statist. 11 : 81 – 92 .
- Barry , D. , Hartigan , J. A. (1993). A Bayesian analysis for change-point problems. J. Amer. Statist. Assoc. 88:309–319.
- Booth , N. B. , Smith , A. F. M. ( 1982 ). Bayesian approach to retrospective identification of change-point . J. Econom. 19 : 7 – 22 .
- Carlin , B. P. , Gelfand , A. E. , Smith , A. F. M. ( 1992 ). Hierarchical Bayesian analysis of change point problems . Appl. Statist. 41 : 389 – 405 .
- Cheon , S. , Kim , J. ( 2010 ). Multiple change-point detection of multivariate mean vectors with the Bayesian approach . Comput. Statist. Data Anal. 54 : 406 – 415 .
- Chin Choy , J. , Broemeling , L. ( 1980 ). Some Bayesian inference for a changing linear model . Technometrics 22 : 71 – 78 .
- Cobb , G. W. ( 1978 ). The problem of Nile: conditional solution to a change point problem . Biometrika 65 : 243 – 251 .
- Crowley , E. M. ( 1997 ). Product partition models for normal means . J. Amer. Statist. Assoc. 92 : 192 – 198 .
- Delyon , B. , Lavielle , M. , Moulines , E. ( 1999 ). Convergence of a stochastic approximation version of the EM algorithm . Ann. Statist. 27 : 94 – 128 .
- Ferreira , P. E. ( 1975 ). A Bayesian analysis of a switching regression model: a known number of regimes . J. Amer. Statist. Assoc. 70 : 370 – 374 .
- George , E. I. , McCulloch , R. E. ( 1993 ). Variable selection via Gibbs sampling . J. Amer. Statist. Assoc. 88 : 881 – 889 .
- Harvey , A. C. , Durbin , J. ( 1986 ). The effects of seat belt legislation on British road casualties: A case study in structural time series modelling . J. Roy. Statist. Soc. Ser. A 149 : 187 – 227 .
- Harvey , A. C. ( 1989 ). Forecasting Structural Time Series Models and the Kalman Filter . Cambridge , UK : Cambridge University Press .
- Hawkins , D. M. ( 2001 ). Finding multiple change-point models to data . Comput. Stat. Data Anal. 37 : 323 – 341 .
- Hinkley , D. V. ( 1970 ). Inference about the change-point in a sequence of random varibles . Biometrika 57 : 1 – 17 .
- Holbert , D. , Broemeling , L. D. ( 1977 ). Bayesian inference related to shifting sequences and two-phase regression . Commun. Statist. Ser. A 6 : 265 – 275 .
- James , B. , James , K. L. , Siegmund , D. ( 1987 ). Tests for a change-point . Biometrika 74 : 71 – 83 .
- James , B. , James , K. L. , Siegmund , D. ( 1988 ). Conditional boundary crossing probabilities with applications to change-point problem . Ann. Probab. 16 : 839 – 852 .
- Kim , H. J. , Fay , M. P. , Yu , B. , Barrett , M. J. , Feuer , E. J. ( 2004 ). Comparability of segmented linear regression models . Biometrics 60 : 1005 – 1014 .
- Lavielle , M. , Lebarbier , E. ( 2001 ). An application of MCMC methods for the multiple change-points problem . Signal Process. 81 : 39 – 53 .
- Lee , C. B. ( 1998 ). Bayesian analysis of a change-point in exponential families with applications . Comput. Stat. Data Anal. 27 : 195 – 208 .
- Lee , A. S. F. , Heghinian , S. M. ( 1977 ). A shift of the mean level in a sequence of independent normal random variables–a Bayesian approach . Technometrics 19 : 503 – 506 .
- Loschi , R. H. , Cruz , F. R. B. ( 2005 ). Extension to the product partition model: Computing the probability of a change . Comput. Statist. Data Anal. 48 : 255 – 268 .
- Moen , D. H. , Salazar , D. , Broemeling , L. D. ( 1985 ). Structural changes in multivariate regression models . Commun. Statist. Ser. A 14 : 1757 – 1768 .
- Perreault , L. , Hache , M. , Slivitsky , M. , Bobee , B. ( 1999 ). Detection of changes in precipitation and runoff over eastern Canada and US using a Bayesian approach . Stochastic Environ. Res. Risk Assess. 13 : 201 – 216 .
- Perreault , L. , Bernier , J. , Bobee , B. , Parent , E. ( 2000a ). Bayesian change-point analysis in hydrometeorological time series. Part 1. The normal model revisited . J. Hydrol. 235 : 221 – 241 .
- Perreault , L. , Bernier , J. , Bobee , B. , Parent , E. (2000b). Bayesian change-point analysis in hydrometeorological time series. Part 2. Comparison of change-point models and forecasting. J. Hydrol. 235:242–263.
- Pettitt , A. N. ( 1980 ). A simple cumulative sum type statistic for the change-point problem with zero-one observations . Biometrika 67 : 79 – 84 .
- Rao , A. R. , Tirtotjondro , W. ( 1996 ). Investigation of changes in characteristics of hydrological time series by Bayesian methods . Stochastic Hydrol. Hydraul. 10 : 259 – 317 .
- Smith , A. F. M. , Cook , D. G. ( 1980 ). Straight lines with a change-point: a Bayesian analysis of some renal transplant data . Appl. Statist. 29 : 180 – 189 .
- Smith , A. F. M. ( 1975 ). Bayesian approach to inference about change-point in sequence of random variables . Biometrika 62 : 407 – 416 .
- Stephens , D. A. ( 1994 ). Bayesian retrospective multiple-change point identification . Appl. Statist. 43 : 159 – 178 .
- Tourneret , J. Y. , Doisy , M. , Lavielle , M. ( 2003 ). Bayesian off-line detection of multiple change-points corrupted by multiplicative noise: application to SAR image edge detection . Signal Process. 83 : 1871 – 1887 .
- Trwari , R. , Cronin , K. , Davis , W. , Feuer , E. J. , Yu , B. , Chib , S. ( 2005 ). Bayesian model selection for join point regression with application to age-adjusted cancer rates . Appl. Statist. 54 : 919 – 939 .
- Venter , J. H. , Steel , S. J. ( 1996 ). Finding multiple abrupt change points . Comput. Statist. Data Anal. 22 : 481 – 504 .
- Wong , H. , Hu , B. Q. , Ip , W. C. , Xia , J. ( 2006 ). Change-point analysis of hydrological time series using grey relational method . J. Hydrol. 324 : 323 – 338 .
- Yu , B. , Barrett , M. J. , Kim , H. J. , Feuer , E. J. ( 2007 ). Estimating join points in continuous time scale for multiple change-point models . Comput. Stat. Data Anal. 51 : 2420 – 2427 .