Optimal growth order of the number of vertices and facets in the class of Hausdorff methods for polyhedral approximation of convex bodies

Optimal growth order of the number of vertices and facets in the class of Hausdorff methods for polyhedral approximation of convex bodies

The internal polyhedral approximation of convex compact bodies with twice continuously differentiable boundaries and positive principal curvatures is considered. The growth of the number of facets in the class of Hausdorff adaptive methods of internal polyhedral approximation that are asymptotically...

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Veröffentlicht in:Computational mathematics and mathematical physics 2011-06, Vol.51 (6), p.952-964
Hauptverfasser: Efremov, R. V., Kamenev, G. K.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Approximation
Asymptotic properties
Boundaries
Computational mathematics
Computational Mathematics and Numerical Analysis
Constants
Curvature
Euclidean space
Image coding
Mathematical analysis
Mathematical models
Mathematics
Mathematics and Statistics
Optimization
Polyhedra
Polytopes
Studies
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Zusammenfassung:The internal polyhedral approximation of convex compact bodies with twice continuously differentiable boundaries and positive principal curvatures is considered. The growth of the number of facets in the class of Hausdorff adaptive methods of internal polyhedral approximation that are asymptotically optimal in the growth order of the number of vertices in approximating polytopes is studied. It is shown that the growth order of the number of facets is optimal together with the order growth of the number of vertices. Explicit expressions for the constants in the corresponding bounds are obtained.
ISSN:0965-5425
1555-6662
DOI:10.1134/S0965542511060054