路径依赖随机微分方程开集上的生存性性质

数学物理学报 ›› 2015, Vol. 35 ›› Issue (6): 1168-1179.

路径依赖随机微分方程开集上的生存性性质

张良泉^1,2

1 北京邮电大学理学院北京 100876;
2 法国国家信息与自动化研究院(INRIA) 法国雷恩 35042

收稿日期:2014-10-30 修回日期:2015-06-01 出版日期:2015-12-25 发布日期:2015-12-25
作者简介:张良泉,xiaoquan51011@163.com
基金资助:
国家自然科学基金(11201263,11201264,11301298)、山东省自然科学基金(ZR2012AQ004)和ITEA MODRIO project of INRIA资助

The Viability Property for Path-Dependent SDE Under Open Constraints

Liangquan Zhang^1,2

1 School of Science, Beijing University of Posts and Telecommunications, Beijing 100876;
2 INRIA, Campus de Beaulieu, Rennes France 35042

Received:2014-10-30 Revised:2015-06-01 Online:2015-12-25 Published:2015-12-25

摘要/Abstract

摘要：

该文研究满足李普希兹条件路径依赖随机微分方程在Rⁿ中有限开集上生存性性质,该结果将最近Cannarsa, Prato和Frankowska测度不变性结果推广到非马尔科夫情形.

关键词: 随机生存性, 路径依赖随机微分方程, 泛函伊藤积分

Abstract:

In this note, we study the viability of a bounded open domain in Rⁿ for a process driven by a path-dependent stochastic differential equation with Lipschitz data. We extend an invariant result of Cannarsa, Prato and Frankowska to a non-Markovian setting.

Key words: Stochastic viability, Path-dependent stochastic differential equations, Functional Itô, calculus

中图分类号:

O211.63

张良泉. 路径依赖随机微分方程开集上的生存性性质[J]. 数学物理学报, 2015, 35(6): 1168-1179.

Liangquan Zhang. The Viability Property for Path-Dependent SDE Under Open Constraints[J]. Acta mathematica scientia,Series A, 2015, 35(6): 1168-1179.

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