1. Perlman, M.D. and Wellner, J.A.. Squaring the Circle and Cubing the Sphere: Circular and Spherical Copulas. arXiv.org perpetual, non-exclusive license, 2011, arXiv, Other Statistics (stat.OT), FOS: Computer and information sciences, FOS: Computer and information sciences, 62H05, 62E10 (primary), 62H11, 60E05 (secondary), https://arxiv.org/abs/1101.0145, 10.48550/ARXIV.1101.0145
2. Mai, J.-F. and Schenk, S. and Scherer, M. (2015) Analyzing model robustness via a distortion of the stochastic root: A Dirichlet prior approach. Statistics & Risk Modeling 32(3-4): 177--195 https://doi.org/doi:10.1515/strm-2015-0009, 2023-03-31, https://doi.org/10.1515/strm-2015-0009
3. Huillet, T.E. (2018) Stochastic species abundance models involving special copulas. Physica A: Statistical Mechanics and its Applications 490: 77-91 https://doi.org/https://doi.org/10.1016/j.physa.2017.08.021, Species extinctions and abundances, Extremes distribution, Copulas, https://www.sciencedirect.com/science/article/pii/S0378437117307458, 0378-4371
4. Bayes, T. (1763) An essay towards solving a problem in the doctrine of chances. Phil. Trans. of the Royal Soc. of London 53: 370--418 2008-10-07T16:03:44.000 +0200, Bayes, Bayesian, MDL, MML, c1763 conditional, joint, jrnl, probability, theorem,, 1f1017bf1b4fb8840f01e1649d1f0804, a7bc6ffe9fc49d87aff583b0f1dda401, https://www.bibsonomy.org/bibtex/21f1017bf1b4fb8840f01e1649d1f0804/brefeld, 2008-10-07T16:03:39.000 +0200, reprinted in Biometrika 45 296-315 1958 Thomas Bayes 1702-1761 http://www.cs.monash.edu.au/\ {}lloyd/tildeImages/People/Bayes/index.html ([about Bayes])
5. Laplace, {Pierre-Simon} (1812) Th\'eorie analytique des probabilit\'es. Courcier, Paris, 2010-02-22T16:43:40.000 +0100, AleatoireBD Publi é, Statistiques, {DescriptifBD,} {HasardBD,} {TirageOLD}, 8c4c8f12f315e3886329d64df7597fd8, 372dcd013904f587a02bf40123a0dd85, https://www.bibsonomy.org/bibtex/28c4c8f12f315e3886329d64df7597fd8/vatchoum, 2010-02-22T16:27:58.000 +0100