一类局部时间随机微分方程的零噪声极限

Pub Date : 2018-10-01 DOI:10.18910/70822
Kazumasa Kuwada, Taroujirou Matsumura
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引用次数: 0

摘要

研究了一类具有不规则漂移的含局部时间的一维随机微分方程解的零噪声极限。期望这些解接近于通过截断噪声项而正式得到的常微分方程的解之一。通过确定极限,我们揭示了局部时间的存在确实会影响渐近行为,而只有当漂移项的强度在不规则点周围接近对称时才会观察到它。针对这一问题,我们还建立了Wentzel-Freidlin型大偏差原理。
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Zero noise limit of a stochastic differential equation involving a local time
This paper studies the zero noise limit for the solution of a class of one-dimensional stochastic differential equations involving local time with irregular drift. These solutions are expected to approach one of the solutions to the ordinary differential equation formally obtained by cutting off the noise term. By determining the limit, we reveal that the presence of the local time really affects the asymptotic behavior, while it is observed only when intensity of the drift term is close to symmetric around the irregular point. Related with this problem, we also establish the Wentzel-Freidlin type large deviation principle.
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