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Please use this identifier to cite or link to this item: http://hdl.handle.net/10525/3299

Title: Differential Inclusions with Upper Semicontinuous Right-Hand Side
Authors: Ivanov, Radostin Petrov
Keywords: multi-function
differential inclusion
directional continuity
upper and low semi-continuity
measurability
Department of Operations Research
Issue Date: Aug-1994
Publisher: Institute of Mathematics with Computer Center at the Bulgarian Academy of Sciences
Citation: Preprint
Series/Report no.: 1994;4
Abstract: An existence theorem is proved for solutions of differential inclusions with an upper semicontinuous and nonconvex right-hand side. The proof is based on an inner and directional continuous parameterization. This parameterization leads to a familie of disturbed differential inclusions. The solution of the starting differential inclusion is obtained as an uniformly limit of the solutions of disturbed systems. Some aspects of the existence of the above mentioned inner parameterization are discussed. A few examples are presented. AMS (MOS) subject classification: 34A60.
Description: [Ivanov Radostin Petrov; Иванов Радостин Петров]
URI: http://hdl.handle.net/10525/3299
Appears in Collections:Preprints

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