Project Details
Transition density estimates for Lévy-type processes
Applicant
Professor Dr. René Leander Schilling
Subject Area
Mathematics
Term
from 2013 to 2015
Project identifier
Deutsche Forschungsgemeinschaft (DFG) - Project number 239237733
Final Report Year
2016
Final Report Abstract
No abstract available
Publications
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Intrinsic small time estimates for distribution densities of Lévy processes. Random Op. Stoch. Eq. 21(4) (2013), 321–344
V. Knopova, A. Kulik
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Compound kernel estimates for the transition probability density of a Lévy process in R . Theory of Probab. and Math. Stat. 89 (2014), 57–70
V. Knopova
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On the small-time behaviour of Lévy-type processes. Stoch. Proc. Appl., 124(6) (2014), 2249–2265
V. Knopova, R. Schilling
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Lower bounds of the Hausdorff dimension for the images of Feller processes. Stat. Probab. Letters. 27 (2015), 222–228
V. Knopova, R. Schilling, J. Wang
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On level and collision sets of some Feller processes. Lat. Am. J. Probab. Math. Stat. 12 (2015), 1001–1029
V. Knopova, R. L. Schilling
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Parametrix construction for certain Lévy-type processes and applications. Rand. Oper. Stoch. Eq. 23(2) (2015), 116–136
V. Knopova, A. Kulik
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Moderate deviations and Strassen’s law for additive processes. J. of Theoretical Probability, June 2016, Volume 29, Issue 2, pp 632–652
F. Kühn, R.L. Schilling
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Intrinsic compound kernel estimates for the transition probability density of a Lévy-type processes and their applications. Probab. Math. Stat. Vol. 37, Fasc. 1 (2017), pp. 53–100
V. Knopova, A. Kulik
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Parametrix construction of the transition probability density of the solution to an SDE driven by α-stable noise. Annales Inst. Henri Poincaré Probab. Statist. Volume 54, Number 1 (2018), 100-140
V. Knopova, A. Kulik