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Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Malicet, Dominique, Mijoule, Guillaume and Poly, Guillaume
(2016)
GENERALIZATION OF THE NUALART-PECCATI CRITERION.
ANNALS OF PROBABILITY, 44 (2).
pp. 924-954.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Mishura, Yuliya and Sabzikar, Farzad
(2022)
How Does Tempering Affect the Local and Global Properties of Fractional Brownian Motion?
JOURNAL OF THEORETICAL PROBABILITY, 35 (1).
pp. 484-527.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Peccati, Giovanni and Yang, Xiaochuan
(2021)
Malliavin-Stein method: a survey of some recent developments.
MODERN STOCHASTICS-THEORY AND APPLICATIONS, 8 (2).
pp. 141-177.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Ljungdahl, Mathias Morck and Thaele, Christoph
(2022)
Multi-dimensional normal approximation of heavy-tailed moving averages.
STOCHASTIC PROCESSES AND THEIR APPLICATIONS, 145.
pp. 308-334.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Gasbarra, Dario and Gaunt, Robert E
(2023)
On algebraic Stein operators for Gaussian polynomials.
BERNOULLI, 29 (1).
pp. 350-376.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Eichelsbacher, Peter and Knichel, Lukas
(2020)
Optimal Gamma Approximation on Wiener Space.
Alea (Rio de Janeiro): Latin American journal of probability and mathematical statistics, 17 (1).
pp. 101-132.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Eichelsbacher, Peter and Thaele, Christoph
(2022)
Optimal Variance-Gamma approximation on the second Wiener chaos.
JOURNAL OF FUNCTIONAL ANALYSIS, 282 (11).
p. 109450.
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Gasbarra, Dario and Gaunt, Robert E
(2021)
An asymptotic approach to proving sufficiency of Stein characterisations.
[Preprint]
Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Gasbarra, Dario and Gaunt, Robert E
(2023)
An asymptotic approach to proving sufficiency of Stein characterisations.
ALEA-LATIN AMERICAN JOURNAL OF PROBABILITY AND MATHEMATICAL STATISTICS, 20 (1).
pp. 127-152.
Arras, Benjamin, Azmoodeh, Ehsan ORCID: 0000-0002-0401-793X, Poly, Guillaume and Swan, Yvik
(2019)
A bound on the Wasserstein-2 distance between linear combinations of independent random variables.
STOCHASTIC PROCESSES AND THEIR APPLICATIONS, 129 (7).
pp. 2341-2375.