多值映射的连续分支与右手边非凸的函数微分包含

Mathematics of The Ussr-sbornik Pub Date : 1992-02-28 DOI:10.1070/SM1992V071N02ABEH001398

A. Bulgakov

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引用次数: 5

摘要

证明了在bochner可积映射空间中，具有非凸映像的多值映射具有连续分支，该分支对于给定的单值映射和给定精度，实现了单值映射映像与多值映射映像之间的距离。这一结果应用于研究右手边为非凸的泛函微分包含的解的性质。

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CONTINUOUS BRANCHES OF MULTIVALUED MAPPINGS AND FUNCTIONAL-DIFFERENTIAL INCLUSIONS WITH NONCONVEX RIGHT-HAND SIDE

It is proved that in the space of Bochner-integrable mappings a multivalued mapping with nonconvex images has a continuous branch that, for a given single-valued mapping and for a previously specified accuracy, realizes the distance between the images of the single-valued mapping and the multivalued mapping. This result is applied to the investigation of properties of solutions of functional-differential inclusions with nonconvex right-hand side.

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Mathematics of The Ussr-sbornik

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