| 倒向随机微分方程解的比较定理 |
| |
| 引用本文: | 曹志刚,严加安.倒向随机微分方程解的比较定理[J].数学进展,1999,28(4):304-308. |
| |
| 作者姓名: | 曹志刚 严加安 |
| |
| 作者单位: | [1]中国人民大学信息学院 [2]中国科学院系统所 |
| |
| 摘 要: | 毛学荣新近将彭实戈和Pardoux关于倒向随机策分方程解的存在性定理推广到非Lipschitz系数情景,此文将彭实戈的比较定理推广到这一情形,主要工具是Tanaka-Meyer公式,Davis不等式和Bihari不等式。
|
| 关 键 词: | 随机微分方程 比较定理 局部时 解 T-M不等式 |
A Comparison Theorem for Solutions of Backward Stochastic Differential Equations |
| |
| Cao Zhigang.A Comparison Theorem for Solutions of Backward Stochastic Differential Equations[J].Advances in Mathematics,1999,28(4):304-308. |
| |
| Authors: | Cao Zhigang |
| |
| Abstract: | The existence theorem for solutions of BSDE's and a comparison theorem for solutions of one-dimensional BSDE's were established by Pardoux-Peng3] and PengI4] respectively. Ma.2] has generalized the existence theorem to the case of non-Lipschitzian coefficients. The present paper generalizes Peng's comparison theorem to that case. The main tools are the Tanaka-Meyer formula,Davis' inequality and Bihari's inequality. |
| |
| Keywords: | backward stochastic differential equation Bihari's inequality comparison theroem local time Tanaka-Meyer formula |
| 本文献已被 CNKI 维普 等数据库收录! |
