Paul H. Jung, Ph.D.
Affiliations: | 2003 | University of California, Los Angeles, Los Angeles, CA |
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"Paul Jung"Parents
Sign in to add mentor| Thomas Liggett | grad student | 2003 | UCLA | |
| (On invariant measures of the exclusion process and related processes.) | ||||
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Publications
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| Jung P, Melbourne I, Pène F, et al. (2020) Necessary and sufficient condition for ℳ2-convergence to a Lévy process for billiards with cusps at flat points Stochastics and Dynamics. 2150024 |
| Jung P, Pène F, Zhang H. (2020) Convergence to a-stable Lévy motion for chaotic billiards with several cusps at flat points Nonlinearity. 33: 807-839 |
| Collevecchio A, Jung P. (2020) On the speed and spectrum of mean-field random walks among random conductances Stochastic Processes and Their Applications. 130: 3477-3498 |
| Jung P, Zhang H. (2018) Stable Laws for Chaotic Billiards with Cusps at Flat Points Annales Henri Poincaré. 19: 3815-3853 |
| Jung P, Owada T, Samorodnitsky G. (2017) Functional central limit theorem for a class of negatively dependent heavy-tailed stationary infinitely divisible processes generated by conservative flows Annals of Probability. 45: 2087-2130 |
| Jung PH. (2017) Lévy-Khintchine random matrices and the Poisson weighted infinite skeleton tree Transactions of the American Mathematical Society. 370: 641-668 |
| Jung P, Markowsky GT. (2015) Hölder Continuity and Occupation-Time Formulas for fBm Self-Intersection Local Time and Its Derivative Journal of Theoretical Probability. 28: 299-312 |
| Dombry C, Jung P. (2014) A Lindeberg–Feller theorem for stable laws Statistics & Probability Letters. 84: 198-203 |
| Jung P, Markowsky G. (2014) On the Tanaka formula for the derivative of self-intersection local time of fractional Brownian motion Stochastic Processes and Their Applications. 124: 3846-3868 |
| Jung P. (2014) Random-Time Isotropic Fractional Stable Fields Journal of Theoretical Probability. 27: 618-633 |