| [1] |
CampbellJ. The Poisson correlation function. Proc Edinburgh Math Soc1934, 4:18-26. · Zbl 0009.02801 |
| [2] |
M’KendrickA. Applications of mathematics to medical problems. Proc Edinburgh Math Soc1925, 44:98-130. · JFM 52.0542.04 |
| [3] |
TeicherH. On the multivariate Poisson distribution. Scand Actuar J1954, 1954:1-9. · Zbl 0056.35801 |
| [4] |
WicksellSD. Some theorems in the theory of probability, with special reference to their importance in the theory of homograde correlation. Svenska Aktuarieföreningen Tidskrift. 1916:165-213. |
| [5] |
NikoloulopoulosAK. Copula‐based models for multivariate discrete response data. In: JaworskiP (ed.), DuranteF (ed.), HärdleW (ed.), eds. Copulae in Mathematical and Quantitative Finance. Berlin Heidelberg: Springer‐Verlag; 2013. · Zbl 06210183 |
| [6] |
NikoloulopoulosAK, KarlisD. Modeling multivariate count data using copulas. Commun Stat Simul Comput2009, 39:172-187. · Zbl 1183.62100 |
| [7] |
Xue‐Kun SongP. Multivariate dispersion models generated from gaussian copula. Scand J Stat2000, 27:305-320. · Zbl 0955.62054 |
| [8] |
HolgateP. Estimation for the bivariate Poisson distribution. Biometrika1964, 51:241-287. · Zbl 0133.11802 |
| [9] |
DwassM, TeicherH. On infinitely divisible random vectors. Ann Math Stat1957, 28:461-470. · Zbl 0078.31303 |
| [10] |
KawamuraK. The structure of multivariate Poisson distribution. Kodai Math J1979, 2:337-345. · Zbl 0434.60019 |
| [11] |
SrivastavaR, SrivastavaA. On a characterization of Poisson distribution. J Appl Probab1970, 7:497-501. · Zbl 0202.17502 |
| [12] |
WangY. Characterizations of certain multivariate distributions. Mathematical Proceedings of the Cambridge Philosophical Society1974, 75:219-234. · Zbl 0295.62013 |
| [13] |
JohnsonNL, KotzS, BalakrishnanN. Discrete Multivariate Distributions, vol. 165. New York: John Wiley & Sons; 1997. · Zbl 0868.62048 |
| [14] |
KrishnamoorthyA. Multivariate binomial and Poisson distributions. Sankhyā: Indian J Stat1951, 11:117-124. · Zbl 0044.13502 |
| [15] |
KrummenauerF. Limit theorems for multivariate discrete distributions. Metrika1998, 47:47-69. · Zbl 1092.60504 |
| [16] |
MahamunuluD. A note on regression in the multivariate Poisson distribution. J Am Stat Assoc1967, 62:251-258. · Zbl 0147.37802 |
| [17] |
KanoK, KawamuraK. On recurrence relations for the probability function of multivariate generalized Poisson distribution. Commun Stat Theory Methods1991, 20:165-178. · Zbl 0733.60025 |
| [18] |
KarlisD. An em algorithm for multivariate Poisson distribution and related models. J Appl Stat2003, 30:63-77. · Zbl 1121.62408 |
| [19] |
LoukasS, KempC. On computer sampling from trivariate and multivariate discrete distributions: multivariate discrete distributions. J Stat Comput Simul1983, 17:113-123. · Zbl 0506.65003 |
| [20] |
TsiamyrtzisP, KarlisD. Strategies for efficient computation of multivariate Poisson probabilities. Commun Stat Simul Comput2004, 33:271-292. · Zbl 1100.62541 |
| [21] |
SklarA. Fonctions de répartition à n dimensions et leurs marges. Publ Inst Statist Univ Paris1959, 8:229-231. · Zbl 0100.14202 |
| [22] |
CherubiniU, LucianoE, VecchiatoW. Copula Methods in Finance. Hoboken, NJ: John Wiley & Sons; 2004. · Zbl 1163.62081 |
| [23] |
GenestC, NešlehováJ. A primer on copulas for count data. Astin Bull2007, 37:475-515. · Zbl 1274.62398 |
| [24] |
NikoloulopoulosAK. On the estimation of normal copula discrete regression models using the continuous extension and simulated likelihood. J Stat Plann Inference2013, 143:1923-1937. · Zbl 1279.62116 |
| [25] |
NikoloulopoulosAK. Efficient estimation of high‐dimensional multivariate normal copula models with discrete spatial responses. Stoch Environ Res Risk Assess2016, 30:493-505. |
| [26] |
RüschendorfL. Copulas, Sklar’s theorem, and distributional transform. In: Mathematical Risk Analysis. Berlin, Heidelberg: Springer‐Verlag; 2013, 3-34(Chapter 1). |
| [27] |
DemartaS, McNeilAJ. The t copula and related copulas. Int Stat Rev2005, 73:111-129. · Zbl 1104.62060 |
| [28] |
TrivediPK, ZimmerDM. Copula Modeling: An Introduction for Practitioners. Foundations and Trends^® in Econometrics, vol. 1. Boston ‐ Delft: now publishers; 2007, 1-111. · Zbl 1195.91130 |
| [29] |
AasK, CzadoC, FrigessiA, BakkenH. Pair‐copula constructions of multiple dependence. Insur: Math Econ2009, 44:182-198. · Zbl 1165.60009 |
| [30] |
BedfordT, CookeRM. Vines: a new graphical model for dependent random variables. Ann Stat2002, 30:1031-1068. · Zbl 1101.62339 |
| [31] |
CookRJ, LawlessJF, LeeK‐A. A copula‐based mixed Poisson model for bivariate recurrent events under event‐dependent censoring. Stat Med2010, 29:694-707. |
| [32] |
YahavI, ShmueliG. On generating multivariate Poisson data in management science applications. Appl Stoch Models Bus Ind2012, 28:91-102. · Zbl 06292433 |
| [33] |
SklarA. Random variables, joint distribution functions, and copulas. Kybernetika1973, 9:449-460. · Zbl 0292.60036 |
| [34] |
KarlisD. Models for multivariate count time series. In: DavisRA (ed.), HolanSH (ed.), LundR (ed.), RavishankerN (ed.), eds. Handbook of Discrete‐Valued Time Series. Boca Raton, FL: CRC Press; 2016, 407-424(Chapter 19). |
| [35] |
JoeH, XuJJ. The estimation method of inference functions for margins for multivariate models. Technical Report 166, The University of British Columbia, Vancouver, Canada, 1996. |
| [36] |
DenuitM, LambertP. Constraints on concordance measures in bivariate discrete data. J Multivariate Anal2005, 93:40-57. · Zbl 1095.62065 |
| [37] |
HeinenA, RengifoE. Multivariate autoregressive modeling of time series count data using copulas. J Empir Finance2007, 14:564-583. |
| [38] |
HeinenA, RengifoE. Multivariate reduced rank regression in nonGaussian contexts, using copulas. Comput Stat Data Anal2008, 52:2931-2944. · Zbl 1452.62068 |
| [39] |
MadsenL. Maximum likelihood estimation of regression parameters with spatially dependent discrete data. J Agric Biol Environ Stat2009, 14:375-391. · Zbl 1306.62310 |
| [40] |
MadsenL, FangY. Joint regression analysis for discrete longitudinal data. Biometrics2011, 67:1171-1175. · Zbl 1226.62055 |
| [41] |
KaziankaH. Approximate copula‐based estimation and prediction of discrete spatial data. Stoch Environ Res Risk Assess2013, 27:2015-2026. |
| [42] |
KaziankaH, PilzJ. Copula‐based geostatistical modeling of continuous and discrete data including covariates. Stoch Environ Res Risk Assess2010, 24:661-673. · Zbl 1416.86025 |
| [43] |
GenzA, BretzF. Computation of Multivariate Normal and t Probabilities, vol. 195. Dordrecht Heidelberg London New York: Springer; 2009. · Zbl 1204.62088 |
| [44] |
PanagiotelisA, CzadoC, JoeH. Pair copula constructions for multivariate discrete data. J Am Stat Assoc2012, 107:1063-1072. · Zbl 1395.62114 |
| [45] |
CzadoC, BrechmannEC, GruberL. Selection of vine copulas. In: Copulae in Mathematical and Quantitative Finance. Berlin Heidelberg: Springer; 2013, 17-37. · Zbl 1273.62110 |
| [46] |
KarlisD, XekalakiE. Mixed Poisson distributions. Int Stat Rev2005, 73:35-58. · Zbl 1104.62010 |
| [47] |
ArbousAG, KerrichJ. Accident statistics and the concept of accidentproneness. Biometrics1951, 7:340-432. |
| [48] |
SteynH. On the multivariate Poisson normal distribution. J Am Stat Assoc1976, 71:233-236. · Zbl 0353.62032 |
| [49] |
AitchisonJ, HoC. The multivariate Poisson‐log normal distribution. Biometrika1989, 76:643-653. · Zbl 0679.62040 |
| [50] |
Aguero‐ValverdeJ, JovanisPP. Bayesian multivariate Poisson lognormal models for crash severity modeling and site ranking. Transp Res Rec: J Transp Res Board2009, 2136:82-91. |
| [51] |
ChibS, WinkelmannR. Markov chain Monte Carlo analysis of correlated count data. J Bus Econ Stat2001, 19:428-435. |
| [52] |
El‐BasyounyK, SayedT. Collision prediction models using multivariate Poisson‐lognormal regression. Accid Anal Prev2009, 41:820-828. |
| [53] |
MaJ, KockelmanKM, DamienP. A multivariate Poisson‐lognormal regression model for prediction of crash counts by severity, using Bayesian methods. Accid Anal Prev2008, 40:964-975. |
| [54] |
ParkE, LordD. Multivariate Poisson‐lognormal models for jointly modeling crash frequency by severity. Transp Res Rec: J Transp Res Board2007, 2019:1-6. |
| [55] |
ZhanX, Abdul AzizHM, UkkusuriSV. An efficient parallel sampling technique for multivariate Poisson‐lognormal model: Analysis with two crash count datasets. Anal Methods Accid Res2015, 8:45-60. |
| [56] |
KarlisD, MeligkotsidouL. Finite mixtures of multivariate Poisson distributions with application. J Stat Plann Inference2007, 137:1942-1960. · Zbl 1116.60006 |
| [57] |
BradleyJR, HolanSH, WikleCK. Computationally efficient distribution theory for Bayesian inference of high‐dimensional dependent count‐valued data. arXiv preprint arXiv:1512.07273, 2015. |
| [58] |
BesagJ. Spatial interaction and the statistical analysis of lattice systems. J R Stat Soc Ser B Stat Methodol1974, 36:192-236. · Zbl 0327.60067 |
| [59] |
InouyeDI, RavikumarP, DhillonIS. Fixed‐length Poisson MRF: adding dependencies to the multinomial. In: Neural Information Processing Systems, 28, 2015. |
| [60] |
InouyeDI, RavikumarP, DhillonIS. Square root graphical models: multivariate generalizations of univariate exponential families that permit positive dependencies. In: International Conference on Machine Learning, 2016. |
| [61] |
YangE, RavikumarP, AllenG, LiuZ. Graphical models via generalized linear models. In: Neural Information Processing Systems, 25, 2012. |
| [62] |
YangE, RavikumarP, AllenG, LiuZ. On Poisson graphical models. In: Neural Information Processing Systems, 26, 2013. |
| [63] |
YangE, RavikumarP, AllenG, LiuZ. Graphical models via univariate exponential family distribution. J Mach Learn Res2015, 16:3813-3847. · Zbl 1351.62111 |
| [64] |
LauritzenSL. Graphical Models. Oxford: Oxford University Press; 1996. · Zbl 0907.62001 |
| [65] |
CliffordP. Markov random fields in statistics. In: Disorder in Physical Systems. Oxford: Oxford Science Publications; 1990. · Zbl 0736.62081 |
| [66] |
WainwrightMJ, JordanMI. Graphical models, exponential families, and variational inference. Found Trends R Mach Learn2008, 1:1-305. · Zbl 1193.62107 |
| [67] |
KollerD, FriedmanN. Probabilistic Graphical Models: Principles and Techniques. Cambridge, MA: MIT Press; 2009. · Zbl 1183.68483 |
| [68] |
YangE, RavikumarP, AllenG, LiuZ. Conditional random fields via univariate exponential families. In: Neural Information Processing Systems, 26, 2013. |
| [69] |
KaiserMS, CressieN. Modeling Poisson variables with positive spatial dependence. Stat Probab Lett1997, 35:423-432. · Zbl 0904.62067 |
| [70] |
MeinshausenN, BühlmannP. High‐dimensional graphs and variable selection with the lasso. Ann Stat2006, 34:1436-1462. · Zbl 1113.62082 |
| [71] |
AllenGI, LiuZ. A log‐linear graphical model for inferring genetic networks from high‐throughput sequencing data. In: 2012 I.E. International Conference on Bioinformatics and Biomedicine, IEEE, 2012, 1-6. |
| [72] |
AllenGI, LiuZ. A local Poisson graphical model for inferring networks from sequencing data. IEEE Trans NanoBiosci2013, 12:189-198. |
| [73] |
HadijiF, MolinaA, NatarajanS, KerstingK. Poisson dependency networks: gradient boosted models for multivariate count data. Mach Learn2015, 100:477-507. · Zbl 1388.62218 |
| [74] |
HanSW, ZhongH. Estimation of sparse directed acyclic graphs for multivariate counts data. Biometrics2016, 72:791-803. · Zbl 1390.62263 |
| [75] |
AlthamPME, HankinRKS. Multivariate generalizations of the multiplicative binomial distribution: introducing the mm package. J Stat Softw2012, 46:1-23. doi:10.18637/jss.v046.i12. |
| [76] |
AlthamPME. Two generalizations of the binomial distribution. J R Stat Soc Ser C Appl Stat1978, 27:162-167. · Zbl 0438.62008 |
| [77] |
NealRM. Annealed importance sampling. Stat Comput2001, 11:125-139. |
| [78] |
MiltonJC, ShankarVN, ManneringFL. Highway accident severities and the mixed logit model: an exploratory empirical analysis. Accid Anal Prev2008, 40:260-266. |
| [79] |
WanY‐W, AllenGI, LiuZ. TCGA2STAT: simple TCGA data access for integrated statistical analysis in R. Bioinformatics2016, 32:952-954. |
| [80] |
GrettonA. A kernel two‐sample test. J Mach Learn Res2012, 13:723-773. · Zbl 1283.62095 |
| [81] |
ZhaoJ, MengD. FastMMD: ensemble of circular discrepancy for efficient two‐sample test. Neural Comput2015, 27:1345-1372. · Zbl 1476.62082 |
| [82] |
InouyeDI, RavikumarP, DhillonIS. Admixtures of Poisson MRFs: a topic model with word dependencies. In: International Conference on Machine Learning, vol 31, 2014. |
| [83] |
InouyeDI, RavikumarP, DhillonIS. Generalized root models: beyond pairwise graphical models for univariate exponential families. arXiv preprint arXiv:1606.00813, 2016. |
| [84] |
H.Liu, F.Han, M.Yuan, J.Lafferty, and L.Wasserman. High dimensional semiparametric Gaussian copula graphical models. Ann Stat, 40:34, 2012. 10.1214/12‐AOS1037. · Zbl 1297.62073 |
