Articles dans des revues avec comité de lecture (40)
  1. 9. Daly, F., Ghaderinezhad, F., Ley, C., & Swan, Y. (2021). Some simple variance bounds from Stein’s method. Alea (Rio de Janeiro), 18(2), 1845-1858. doi:10.30757/ALEA.V18-69
  2. 10. Ernst, M., Reinert, G., & Swan, Y. (2020). First-order covariance inequalities via Stein's method. Bernoulli, 26(3), 2051-2081. doi:10.3150/19-BEJ1182
  3. 11. Arras, B., Azmoodeh, E., Poly, G., & Swan, Y. (2020). Stein characterizations for linear combinations of gamma random variables. Brazilian Journal of Probability and Statistics, 34(2), 394-413. doi:doi:10.1214/18-BJPS420
  4. 12. Gaunt, R., Mijoule, G., & Swan, Y. (2020). Some new Stein operators for product distributions. Brazilian Journal of Probability and Statistics, 34(4), 795-808. doi:doi:10.1214/19-BJPS460
  5. 13. Ernst, M., Reinert, G., & Swan, Y. (2020). First order covariance inequalities via Stein’s method. Bernoulli, 26(3), 2051-2081. doi:doi:10.3150/19-BEJ1182
  6. 14. Arras, B., Azmoodeh, E., Poly, G., & Swan, Y. (2019). A bound on the Wasserstein-2 distance between linear combinations of independent random variables. Stochastic processes and their applications, 129(7), 2341-2375. doi:10.1016/j.spa.2018.07.009
  7. 15. Drescher, M., Louchard, G., & Swan, Y. (2019). The adaptive sampling revisited. Discrete mathematics and theoretical computer science, 21(3). doi:https://doi.org/10.23638/DMTCS-21-3-13
  8. 16. McKeague, I. I., Peköz, E., & Swan, Y. (2019). Stein’s method and approximating the quantum harmonic oscillator. Bernoulli, 25(1), 89-111. doi:10.3150/17-BEJ960
  9. 17. Gaunt, R., Mijoule, G., & Swan, Y. (2019). An algebra of Stein operators. Journal of mathematical analysis and applications, 469(1), 260-279. doi:10.1016/j.jmaa.2018.09.015
  10. 18. Arras, B., & Swan, Y. (2018). IT Formulae for Gamma Target: Mutual Information and Relative Entropy. IEEE transactions on information theory, 64(2), 1083-1091. doi:10.1109/TIT.2017.2759279
  11. 19. Arras, B., & Swan, Y. (2017). A stroll along the gamma. Stochastic processes and their applications, 127(11), 3661-3688. doi:10.1016/j.spa.2017.03.012
  12. 20. Ley, C., Reinert, G., & Swan, Y. (2017). Distances between nested densities and a measure of the impact of the prior in Bayesian statistics. The Annals of applied probability, 27(1), 216-241. doi:10.1214/16-AAP1202
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