Residual mean first-passage time for jump processes: Theory and applications to Lévy flights and fractional Brownian motion

Tejedor V.; Bénichou O.; Metzler R.; Voituriez R.

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Residual mean first-passage time for jump processes: Theory and applications to Lévy flights and fractional Brownian motion

机译：跳跃过程的平均剩余第一次通过时间：Lévy飞行和分数布朗运动的理论和应用

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We derive a functional equation for the mean first-passage time (MFPT) of a generic self-similar Markovian continuous process to a target in a one-dimensional domain and obtain its exact solution. We show that the obtained expression of the MFPT for continuous processes is actually different from the large system size limit of the MFPT for discrete jump processes allowing leapovers. In the case considered here, the asymptotic MFPT admits non-vanishing corrections, which we call residual MFPT. The case of Lévy flights with diverging variance of jump lengths is investigated in detail, in particular, with respect to the associated leapover behavior. We also show numerically that our results apply with good accuracy to fractional Brownian motion, despite its non-Markovian nature.

机译：我们为一维域中的目标建立了通用自相似马尔可夫连续过程的平均首次通过时间（MFPT）的泛函，并获得了精确的解。我们表明，对于连续过程，MFPT的获得的表达式实际上不同于允许跳跃的离散跳转过程的MFPT的较大系统大小限制。在这里考虑的情况下，渐近MFPT允许不消失的校正，我们称其为残差MFPT。特别是针对相关的越级行为，详细研究了跳距差异较大的Lévy飞行情况。我们还通过数字显示了我们的结果，尽管它具有非马尔可夫性质，但它可以很好地应用于分数布朗运动。

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《Journal of physics, A. Mathematical and theoretical》 |2011年第25期|共15页
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Tejedor V.; Bénichou O.; Metzler R.; Voituriez R.;
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Residual mean first-passage time for jump processes: Theory and applications to Lévy flights and fractional Brownian motion

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