A note on integral-convexity in Banach spaces |
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Authors: | B Satco |
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Institution: | “Stefan cel Mare” University of Suceava, Faculty of Electrical Engineering and Computer Science, Universitatii 13, Suceava, Romania |
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Abstract: | In the present paper we focus on a generalization of the notion of integral convexity. This concept, introduced in J.Y. Wang, Y.M. Ma, The integral convexity of sets and functionals in Banach spaces, J. Math. Anal. Appl. 295 (2004) 211-224] by replacing, in the definition of classical notion of convexity, the sum by the integral, has interesting applications in optimal control problems. By using, instead of Bochner integral, a more general vector integral, that of Pettis, we obtain some results on integral-extreme points of subsets of a Banach space stronger than those given in J.Y. Wang, Y.M. Ma, The integral convexity of sets and functionals in Banach spaces, J. Math. Anal. Appl. 295 (2004) 211-224]. Finally, a natural example coming from measure theory is included, in order to reflect the relationships between different kinds of integral convexity. |
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Keywords: | Pettis integral Integral-convex set Integral-extreme point |
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