On the notion ofL?1-completeness of a stochastic flow on a manifold

Yu. E.Gliklikh; L. A.Morozova

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On the notion ofL?1-completeness of a stochastic flow on a manifold

机译：关于流形上随机流的L？1-完备性的概念

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摘要

We introduce the notion ofL?1-completeness for a stochastic flow on manifold and prove a necessary and sufficient condition for a flow to beL?1-complete.L?1-completeness means that the flow is complete (i.e., exists on the given timeinterval) and that it belongs to some sort ofL?1-functional space, natural for manifolds where no Riemannian metric is specified.

机译：我们引入流形上的随机流的L？1-完备性的概念，并证明流为L？1-完备性的充要条件。L？1-完备性意味着流是完整的（即存在于给定的时间间隔），并且它属于某种L？1函数空间，对于没有指定黎曼度量的流形来说很自然。

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《Abstract and applied analysis》 |2002年第12期|共9页
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Yu. E.Gliklikh; L. A.Morozova;
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中图分类数学分析;
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3. Degenerate Semigroups and Stochastic Flows of Mappings in Foliated Manifolds [J] . da Costa Paulo Henrique P., Ruffino Paulo R. Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis . 2015,第3期

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机译：关于流形概念的广义化
7. On the notion of LÃ¢Â€Â‰1-completeness of a stochastic flow on a manifold [O] . L. A. Morozova, Yu. E. Gliklikh 2002

机译：关于流形上的随机流的Lâ1-完备性的概念

On the notion ofL?1-completeness of a stochastic flow on a manifold

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