Abstract
In this work univariate set-valued functions (SVFs, multifunctions) with 1 D compact sets as images are considered. For such a continuous SFV of bounded variation (CBV multifunction), we show that the boundaries of its graph are continuous, and inherit the continuity properties of the SVF. Based on these results we introduce a special class of representations of CBV multifunctions with a finite number of 'holes' in their graphs. Each such representation is a finite union of SVFs with compact convex images having boundaries with continuity properties as those of the represented SVF. With the help of these representations, positive linear operators are adapted to SVFs. For specific positive approximation operators error estimates are obtained in terms of the continuity properties of the approximated multifunction.
Original language | English |
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Pages (from-to) | 39-60 |
Number of pages | 22 |
Journal | Journal of Approximation Theory |
Volume | 159 |
Issue number | 1 |
DOIs | |
State | Published - Jul 2009 |
Keywords
- Compact sets
- Continuous set-valued functions of bounded variation
- Error estimates
- Minkowski sum
- Multi-segmental representation
- Positive linear approximation operators
- Segment functions
- Selection
- Set-valued functions