References
- B.C. Arnold, Conditionally specified distributions: Lecture notes monograph series, In Topics in Statistical Dependence, H.W. Block, A.R. Sampson, and T.H. Savits, eds., Institute of Mathematical Statistics, Hayward, CA, 1990, pp. 13–18.
- B.C. Arnold, E. Castillo, and J. Serbia, Conditionally Specified Distributions, Springer, New York, 1992.
- B.C. Arnold and D.J. Strauss, Bivariate Distributions with Exponential Conditionals, JASA 83 (1988), pp. 522–527. doi: 10.1080/01621459.1988.10478627
- B.C. Arnold and D.J. Strauss, Bivariate distributions with conditionals in prescribed exponential families, JRSS B 53 (1991), pp. 365–375.
- E.L. Barrett-Connor, Diabetes and heart disease, Diabetes Care 26 (2003), pp. 2947–2958. doi: 10.2337/diacare.26.10.2947
- E.L. Barrett-Connor, B.A. Cohn, D.L. Wingard, and S.L. Edelstein, Why is diabetes mellitus a stronger risk factor for fatal ischemic heart disease in women than in men? The Rancho Bernardo Study, JAMA 265 (1991), pp. 627–631. doi: 10.1001/jama.1991.03460050081025
- E.L. Barrett-Connor and D. Grady, Hormone replacement therapy, heart disease, and other considerations, Annu. Rev. Public Health 19 (1998), pp. 55–72. doi: 10.1146/annurev.publhealth.19.1.55
- A.P. Basu and S.K. Dhar, Bivariate geometric distribution, JASS 2 (1995), pp. 33–44.
- A.E. Caballero, Endothelial dysfunction in obesity and insulin resistance: A road to diabetes and heart disease, Obes Res. 11 (2003), pp. 1278–1289. doi: 10.1038/oby.2003.174
- N. Davarzani, J.A. Achcar, E.N. Smirnov, and R. Peeters, Bivariate lifetime geometric distribution in presence of cure fraction, J. Data Sci. 13 (2015), pp. 755–770.
- E.A. Gale and K.M. Gillespie, Diabetes and Gender, Diabetologia 44 (2001), pp. 3–15. doi: 10.1007/s001250051573
- P.L. Gupta, Some characterizations of distributions by truncated events, Statistics 16 (1985), pp. 465–473. doi: 10.1080/02331888508801876
- S.M. Haffner, M.P. Stern, H.P. Hazuda, B.D. Mitchell, and K.K. Patterson, Cardiovascular risk factors in confirmed prediabetic individuals: Does the clock for coronary heart disease start ticking before the onset of clinical diabetes? JAMA 263 (1990), pp. 2893–2898. doi: 10.1001/jama.1990.03440210043030
- A.G. Hawkes, On characterizing the bivariate exponential and geometric distributions, JRSS B 34 (1972), pp. 129–131.
- M.A. Islam, A. Alzaid, R.I. Chowdhury, and K.S. Sultan, A generalized bivariate bernoulli model with covariate dependence, J. Appl. Stat. 40 (2013), pp. 1064–1075. doi: 10.1080/02664763.2013.780156
- K. Jayakumar and D.A. Mundassery, On bivariate geometric distribution, Statistica 67 (2007), pp. 389–404.
- J. Li and S. Dhar, Modeling with bivariate geometric distributions, Commun. Stat – Theory Methods 42 (2013), pp. 252–266. doi: 10.1080/03610926.2011.579704
- J.E. Manson, G.A. Colditz, M.J. Stampfer, W.C. Willett, S. Andrzej, A.S. Krolewski, B. Rosner, R.A. Arky, F.E. Speizer, and C.H. Hennekens, A prospective study of maturity-onset diabetes mellitus and risk of coronary heart disease and stroke in women, Arch. Int. Med. 151 (1991), pp. 1141–1147. doi: 10.1001/archinte.1991.00400060077013
- A.W. Marshal and I.A. Olkin, A multivariate exponential distribution, JASA 62 (1967), pp. 30–44. doi: 10.1080/01621459.1967.10482885
- K.R.M. Nair, Some characterization problems associated with the bivariate exponential and geometric distributions, Ph.D. thesis submitted to the Cochin University of Science and Technology, 1990.
- K.R.M. Nair and N.U. Nair, On characterizing the bivariate exponential and geometric distributions, AISM 40 (1988), pp. 267–271. doi: 10.1007/BF00052343
- A.G. Phatak and M. Sreehari, Some characterizations of a bivariate geometric distributions, J. Indian Stat. Assoc. 19 (1981), pp. 141–146.
- Public Use Dataset, Health and Retirement Study, University of Michigan, Ann Arbor, 1992–2012.
- G. Sreehari, Characterizations via conditional distributions, J. Indian Stat. Assoc. 43 (2005), pp. 77–93.
- M. Sreehari and R. Vasudeva, Characterizations of multivariate geometric distributions in terms of conditional distributions, Metrika 75 (2012), pp. 271–286. doi: 10.1007/s00184-010-0326-4
- K. Sun and A.P. Basu, A characterization of a bivariate geometric distribution, Stat. Probab. Lett. 23 (1995), pp. 307–311. doi: 10.1016/0167-7152(94)00129-V
- E. Xekalaki, Hazard functions and life distribution in discrete time, Commun. Stat, Theory Methods 12 (1983), pp. 2503–2509. doi: 10.1080/03610928308828617