极大不等式及其应用

IF 1.3 Q2 STATISTICS & PROBABILITY Probability Surveys Pub Date : 2022-04-10 DOI:10.1214/23-ps17
Franziska Kuhn, R. Schilling
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引用次数: 2

摘要

极大不等式是一个不等式,它涉及随机过程$(X_t)_{t\geq 0}$的(绝对)最大值$\sup_{s\leq t}|X_{s}|$或运行最大值$\sup_{s\leq t}X_{s}$。讨论了欧几里得空间中具有值的几类随机过程的极大不等式:鞅过程、l过程、l过程、l过程、(复合)伪泊松过程、类稳定过程和由l过程驱动的SDEs的解、强马尔可夫过程和高斯过程。利用Burkholder-Davis-Gundy不等式,讨论了概率的极大估计与分析得到的Hardy-Littlewood极大函数之间的关系。这篇论文已被《概率论》接受发表
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Maximal inequalities and some applications
A maximal inequality is an inequality which involves the (absolute) supremum $\sup_{s\leq t}|X_{s}|$ or the running maximum $\sup_{s\leq t}X_{s}$ of a stochastic process $(X_t)_{t\geq 0}$. We discuss maximal inequalities for several classes of stochastic processes with values in an Euclidean space: Martingales, L\'evy processes, L\'evy-type - including Feller processes, (compound) pseudo Poisson processes, stable-like processes and solutions to SDEs driven by a L\'evy process -, strong Markov processes and Gaussian processes. Using the Burkholder-Davis-Gundy inequalities we als discuss some relations between maximal estimates in probability and the Hardy-Littlewood maximal functions from analysis. This paper has been accepted for publication in Probability Surveys
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来源期刊
Probability Surveys
Probability Surveys STATISTICS & PROBABILITY-
CiteScore
4.70
自引率
0.00%
发文量
9
期刊最新文献
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