Motzkin predecomposable sets (Q475800)
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scientific article; zbMATH DE number 6374615
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Motzkin predecomposable sets |
scientific article; zbMATH DE number 6374615 |
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Motzkin predecomposable sets (English)
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27 November 2014
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The authors introduce and study a family of sets in a finite dimensional Euclidean space. Definition: A nonempty set \(F\subset\mathbb R^n\) is Motzkin predecomposable (M-predecomposable) if there exists a compact convex set \(C\) and a convex cone \(D\) such that \(F = C + D\). They show that the class of M-predecomposable sets is invariant under affine maps and Minkowski sums. They also show that faces of M-predecomposable sets are M-predecomposable as well as the existence of minimal decomposition of M-predecomposable sets. They also provide two characterizations of M-predecomposable sets both related to some properties of their faces.
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Motzkin decomposable sets
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convex sets
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convex cones
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