Blackwell-type theorems for weighted renewal functions
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Publication:483463
DOI10.1134/S0037446614040028zbMath1310.60122arXiv1201.0836OpenAlexW1969800117MaRDI QIDQ483463
Konstantin A. Borovkov, Aleksandr A. Borovkov
Publication date: 17 December 2014
Published in: Siberian Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1201.0836
regular variationlarge deviation probabilitiesBlackwell theoremintegro-local limit theoremslocally constant functionsStone-Shepp theoremsweighted renewal function
Cites Work
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- A renewal theorem of Blackwell type
- Some relations between harmonic renewal measures and certain first passage times
- On generalized renewal measures and certain first passage times
- Second-order subexponential sequences and the asymptotic behavior of their De Pril transform
- Probability theory. Edited by K. A. Borovkov. Transl. from the Russian by O. Borovkova and P. S. Ruzankin
- Integral and integro-local theorems for the sums of random variables with semiexponential distribution
- An Extension of the Concept of Slowly Varying Function with Applications to Large Deviation Limit Theorems
- An Introduction to Heavy-Tailed and Subexponential Distributions
- Weighted renewal functions: a hierarchical approach
- Asymptotic Analysis of Random Walks
- Harmonic Renewal Sequences and the First Positive Sum
- Harmonic renewal measures
- Some Blackwell-Type Renewal Theorems for Weighted Renewal Functions
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