James A. Fill
Affiliations: | Applied Mathematics and Statistics | Johns Hopkins University, Baltimore, MD |
Area:
Applied Mathematics, MathematicsGoogle:
"James Fill"Children
Sign in to add trainee| Nevin Kapur | grad student | 2003 | Johns Hopkins |
| Patrick Bindjeme | grad student | 2012 | Johns Hopkins |
| Vince Lyzinski | grad student | 2013 | Johns Hopkins |
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Publications
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| Fill JA, Hung W. (2019) QuickSort: Improved right-tail asymptotics for the limiting distribution, and large deviations Electronic Journal of Probability. 24 |
| Clément J, Fill JA, Nguyen Thi TH, et al. (2016) Towards a Realistic Analysis of the QuickSelect Algorithm Theory of Computing Systems. 58: 528-578 |
| Fill JA, Lyzinski V. (2015) Strong Stationary Duality for Diffusion Processes Journal of Theoretical Probability |
| Fill JA, Matterer J. (2014) Quickselect tree process convergence, with an application to distributional convergence for the number of symbol comparisons used by worst-case find Combinatorics Probability and Computing. 23: 805-828 |
| Fill JA, Lyzinski V. (2014) Hitting Times and Interlacing Eigenvalues: A Stochastic Approach Using Intertwinings Journal of Theoretical Probability. 27: 954-981 |
| Fill JA, Nakama T. (2013) Distributional convergence for the number of symbol comparisons used by QuickSelect Advances in Applied Probability. 45: 425-450 |
| Fill JA, Kahn J. (2013) Comparison inequalities and fastest-mixing Markov chains Annals of Applied Probability. 23: 1778-1816 |
| Fill JA. (2013) Distributional convergence for the number of symbol comparisons used by quicksort Annals of Applied Probability. 23: 1129-1147 |
| Fill JA, Huber ML. (2010) Perfect simulation of Vervaat perpetuities Electronic Communications in Probability. 15: 96-109 |
| Fill JA. (2009) The passage time distribution for a birth-and-death chain: Strong stationary duality gives a first stochastic proof Journal of Theoretical Probability. 22: 543-557 |