https://orcid.org/0000-0001-8606-570X
References
- D.D. Boos and C. Brownie, Mixture models for continuous data in dose-response studies when some animals are unaffected by treatment, Biometrics 47 (1991), pp. 1489–1504. doi: 10.2307/2532401
- R. Charnigo and J. Sun, Testing homogeneity in a mixture distribution via the L2 distance between competing models, J. Amer. Statist. Assoc. 99 (2004), pp. 488–498. doi: 10.1198/016214504000000494
- R. Charnigo and J. Sun, Asymptotic relationships between the D-test and likelihood ratio-type tests for homogeneity, Statist. Sinica 20 (2010), pp. 497–512.
- H. Chen and J. Chen, The likelihood ratio test for homogeneity in finite mixture models, Canad. J. Statist. 29 (2001), pp. 201–215. doi: 10.2307/3316073
- H. Chen and J. Chen, Tests for homogeneity in normal mixtures in the presence of a structural parameter, Statist. Sinica 13 (2003), pp. 351–365.
- J. Chen and P. Li, Hypothesis test for normal mixture models: The EM approach, Ann. Statist. 37 (2009), pp. 2523–2542. doi: 10.1214/08-AOS651
- J. Chen, S. Li, and X. Tan, Consistency of the penalized MLE for two-parameter gamma mixture models, Sci. China Math. 59 (2016), pp. 2301–2318. doi: 10.1007/s11425-016-0125-0
- J. Chen, X. Tan, and R. Zhang, Inference for normal mixtures in mean and variance, Statist. Sinica 18 (2008), pp. 443–465.
- D. Dacunha-Castelle and E. Gassiat, Testing the order of a model using locally conic parametrization: Population mixtures and stationary ARMA processes, Ann. Statist. 27 (1999), pp. 1178–1209. doi: 10.1214/aos/1017938921
- A.P. Doulgeris and T. Eltoft, Scale mixture of gaussian modelling of polarimetric SAR data, EURASIP J. Adv. Sig. Proc. 2010 (2009), p. 2. article ID 874592, DOI:10.1155/2010/874592.
- Y. Fu, J. Chen, and J.D. Kalbfleisch, Modified likelihood ratio test for homogeneity in a two-sample problem, Statist. Sinica 19 (2009), pp. 1603–1619.
- B. Garel, Asymptotic theory of the likelihood ratio test for the identification of a mixture, J. Statist. Plann. Inference 131 (2005), pp. 271–296. doi: 10.1016/j.jspi.2004.01.006
- P.I. Good, Detection of a treatment effect when not all experimental subjects will respond to treatment, Biometrics 35 (1979), pp. 483–489. doi: 10.2307/2530351
- R.J. Hathaway, A constrained formulation of maximum-likelihood estimation for normal mixture distributions, Ann. Statist. 13 (1985), pp. 795–800. doi: 10.1214/aos/1176349557
- F. Ketterer and H. Holzmann, Testing for intercept-scale switch in linear autoregression, Canad. J. Statist. 40 (2012), pp. 427–446. doi: 10.1002/cjs.11137
- T. Lancaster and G. Imbens, Case-control studies with contaminated controls, J. Econ. 71 (1996), pp. 145–160. doi: 10.1016/0304-4076(94)01698-4
- J.F. Lawless, Statistical Models and Methods for Lifetime Data, 2nd ed., John Wiley and Sons, Hoboken, 2003.
- P. Li, J. Chen, and P. Marriott, Non-finite fisher information and homogeneity: An EM approach, Biometrika 96 (2009), pp. 411–426. doi: 10.1093/biomet/asp011
- G. Liu, Y. Fu, P. Li, and X. Pu, Using differential variability to increase the power of the homogeneity test in a two-sample problem, Statist. Sinica 28 (2018), pp. 27–41.
- X. Liu, C. Pasarica, and Y. Shao, Testing homogeneity in gamma mixture models, Scand. J. Statist. 30 (2003), pp. 227–239. doi: 10.1111/1467-9469.00328
- X. Liu and Y. Shao, Asymptotics for likelihood ratio tests under loss of identifiability, Ann. Statist. 31 (2003), pp. 807–832. doi: 10.1214/aos/1056562463
- Y. Liu, P. Li, and Y. Fu, Testing homogeneity in a semiparametric two-sample problem, J. Probab. Statist. 2012 (2012). article ID 537474, DOI:10.1155/2012/537474.
- P. Loisel, B. Goffinet, H. Monod, and G. Montes De Oca, Detecting a major gene in an f2 population, Biometrics 50 (1994), pp. 512–516. doi: 10.2307/2533394
- G.J. McLachlan and D. Peel, Finite Mixture Models, Wiley, New York, 2000.
- S. Naya, R. Cao, I. López De Ullibarri, R. Artiaga, F. Barbadillo, and A. García, Logistic mixture model versus Arrhenius for kinetic study of material degradation by dynamic thermogravimetric analysis, J. Chemom. 20 (2006), pp. 158–163. doi: 10.1002/cem.1023
- J.C. Naylor and A.F.M. Smith, Contamination model in clinical chemistry: An illustration of a method for the effcient computation of posterior distributions, J. Roy. Statist. Soc. Ser. D 11 (1983), pp. 82–87.
- Y. Ning and Y. Chen, A class of pseudolikelihood ratio tests for homogeneity in exponential tilt mixture models, Scand. J. Statist. 42 (2015), pp. 504–517. doi: 10.1111/sjos.12119
- X. Niu, P. Li, and P. Zhang, Testing homogeneity in a multivariate mixture model, Canad. J. Statist. 39 (2011), pp. 218–238. doi: 10.1002/cjs.10106
- X. Niu, P. Li, and P. Zhang, Testing homogeneity in a scale mixture of normal distributions, Statist. Papers 57 (2016), pp. 499–516. doi: 10.1007/s00362-015-0665-3
- J. Qin and K.Y. Liang, Hypothesis testing in a mixture case-control model, Biometrics 67 (2011), pp. 182–193. doi: 10.1111/j.1541-0420.2010.01409.x
- A.R. Rao and K.A. Hamed, Flood Frequency Analysis, CRC Press, New York, 2000.
- K. Roeder, A graphical technique for determining the number of components in a mixture of normals, J. Amer Statist. Assoc. 89 (1994), pp. 487–495. doi: 10.1080/01621459.1994.10476772
- J. Shen and X. He, Inference for subgroup analysis with a structured logistic-normal mixture model, J. Amer. Statist. Assoc. 110 (2015), pp. 303–312. doi: 10.1080/01621459.2014.894763
- E. Slud, Testing for imperfect debugging in software reliability, Scand. J. Statist. 24 (1997), pp. 555–572. doi: 10.1111/1467-9469.00081
- A.E. Teschendorff and M. Widschwendter, Differential variability improves the identifcation of cancer risk markers in DNA methylation studies profling precursor cancer lesions, Bioinformatics 28 (2012), pp. 1487–1494. doi: 10.1093/bioinformatics/bts170
- M.J. Wainwright and E.P. Simoncelli, Scale mixtures of gaussians and the statistics of natural images, Adv. Neur. Inform. Proc. Syst. 12 (2000), pp. 855–861.
- T.S.T. Wong, K.F. Lam, and V.X. Zhao, Asymptotic null distribution of the modified likelihood ratio test for homogeneity in finite mixture models, Comput. Statist. Data Anal. 127 (2018), pp. 248–257. doi: 10.1016/j.csda.2018.05.010