其次,利用随机分析技巧和拟有界条件,建立了伊藤随机泛函微分方程解的延拓定理;
Furthermore, a continuation theorem for stochastic functional differential equations of Ito-type is given by using stochastic analysis technique and the quasi-boundedness condition.
证明过程中主要应用了分析中的压缩映象原理和一些空间的性质,通过构造可计算函数,来把解从一个区间延拓到整个空间。
We mainly apply the contraction principle in analysis and properties of some Spaces. By the computable functions constructed, we extend the solution from the internal to the entire space.
定解问题的衔接条件要求延拓具有连续性。
The definite solutions connective condition asks for the continuation continuity.
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