On operator fractional Lévy motion: integral representations and time-reversibility

Pub Date : 2021-01-10 DOI:10.1017/apr.2021.41
B. C. Boniece, G. Didier
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引用次数: 3

Abstract

Abstract In this paper, we construct operator fractional Lévy motion (ofLm), a broad class of infinitely divisible stochastic processes that are covariance operator self-similar and have wide-sense stationary increments. The ofLm class generalizes the univariate fractional Lévy motion as well as the multivariate operator fractional Brownian motion (ofBm). OfLm can be divided into two types, namely, moving average (maofLm) and real harmonizable (rhofLm), both of which share the covariance structure of ofBm under assumptions. We show that maofLm and rhofLm admit stochastic integral representations in the time and Fourier domains, and establish their distinct small- and large-scale limiting behavior. We also characterize time-reversibility for ofLm through parametric conditions related to its Lévy measure. In particular, we show that, under non-Gaussianity, the parametric conditions for time-reversibility are generally more restrictive than those for the Gaussian case (ofBm).
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算子分式Lévy运动的积分表示与时间可逆性
摘要本文构造了算子分数阶lsamvy运动(ofLm),这是一类广义的具有广义平稳增量的协方差算子自相似的无穷可分随机过程。ofLm类推广了单变量分数阶布朗运动和多变量算子分数阶布朗运动。OfLm可以分为两种类型,即移动平均(maofLm)和实调和(rhofLm),它们都具有假设下的ofBm的协方差结构。我们证明了maofLm和rhofLm在时域和傅立叶域中允许随机积分表示,并建立了它们不同的小尺度和大尺度极限行为。我们还通过与其lsamvy测度相关的参数条件来表征ofLm的时间可逆性。特别地,我们证明了在非高斯情况下,时间可逆性的参数条件通常比高斯情况下的参数条件更严格。
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