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On the splitting problem for selections |
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| Authors: | Maxim V Balashov |
| Institution: | a Department of Higher Mathematics, Moscow Institute of Physics and Technology, Institutski Str. 9, Dolgoprudny, Moscow region 141700, Russia b Faculty of Mathematics and Physics, University of Ljubljana, Jadranska 19, Ljubljana 1000, Slovenia c Faculty of Education, University of Ljubljana, Kardeljeva ploš?ad 16, Ljubljana 1000, Slovenia |
| Abstract: | We investigate when does the Repovš-Semenov splitting problem for selections have an affirmative solution for continuous set-valued mappings in finite-dimensional Banach spaces. We prove that this happens when images of set-valued mappings or even their graphs are P-sets (in the sense of Balashov) or strictly convex sets. We also consider an example which shows that there is no affirmative solution of this problem even in the simplest case in R3. We also obtain affirmative solution of the approximate splitting problem for Lipschitz continuous selections in the Hilbert space. |
| Keywords: | Approximate splitting problem Set-valued mapping Continuous selection Lipschitz selection P-set Finite-dimensional Banach space Hilbert space Hausdorff metric Minkowski-Pontryagin difference Geometric difference Chebyshev center Steiner point |
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