Results 121 to 130 of about 2,436 (140)
The Steiner formula for Minkowski valuations.
Adv Math (N Y), 2012 Parapatits L, Schuster FE.
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2013
ISBN-13: 978-1848215894 ; This title focuses on two significant problems in the field of automatic control, in particular state estimation and robust Model Predictive Control under input and state constraints, bounded disturbances and measurement noises.
Le, Vu Tuan Hieu +4 more
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ISBN-13: 978-1848215894 ; This title focuses on two significant problems in the field of automatic control, in particular state estimation and robust Model Predictive Control under input and state constraints, bounded disturbances and measurement noises.
Le, Vu Tuan Hieu +4 more
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Zonotopal Subdivisions of Cyclic Zonotopes
Geometriae Dedicata, 2001Let \({\mathcal Z}(n,d)\) be a cyclic zonotope in \(\mathbb{R}^d\) with \(n\) generating line segments. The following results are proved. (i): The refinement poset of all proper zonotopal subdivisions (tilings) of \({\mathcal Z} (n,d)\) which are induced by the canonical projection \(\pi:{\mathcal Z}(n,d')\to{\mathcal Z}(n,d)\), in the sense of \textit{
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Zonotopes and Parallelotopes [PDF]
Southeast Asian bulletin of mathematics, 2017 Voronoi defined two polyhedral partitions of the cone of semidefinite forms into L-type domains and into perfect domains. Up to equivalence, there is only one domain that is simultaneously perfect and L-type. Voronoi called this domain principal. We show that closure of the principal domain may be identified with a cone of cut submodular set functions.
Dutour Sikirić, Mathieu +1 more
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Journal of Shanghai University (English Edition), 2005
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhao, Lingzhi, Leng, Gangsong
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhao, Lingzhi, Leng, Gangsong
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Mathematika, 1974
By a zonotope we mean any set in Euclidean n-dimensional space Rn which can be written as a Minkowski (vector) sum of a finite number of line segments. A zonotope is a convex centrally-symmetric polytope, and all its faces are zonotopes. Familiar examples of three-dimensional zonotopes include the cube, rhombic dodecahedron, elongated dodecahedron ...
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By a zonotope we mean any set in Euclidean n-dimensional space Rn which can be written as a Minkowski (vector) sum of a finite number of line segments. A zonotope is a convex centrally-symmetric polytope, and all its faces are zonotopes. Familiar examples of three-dimensional zonotopes include the cube, rhombic dodecahedron, elongated dodecahedron ...
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