Results 161 to 170 of about 9,476 (202)
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Computer Aided Geometric Design, 1999
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Prautzsch, H., Bangert, C.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Prautzsch, H., Bangert, C.
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Controlling Quadric Error Simplification with Line Quadrics
Computer Graphics ForumAbstractThis work presents a method to control the output of mesh simplification algorithms based on iterative edge collapses. Traditional mesh simplification focuses on preserving the visual appearance. Despite still being an important criterion, other geometric properties also play critical roles in different applications, such as triangle quality ...
Hsueh‐Ti Derek Liu +2 more
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Russian Mathematical Surveys, 1975
This article is dedicated to Igor Rostislavovich Shafarevich, on his fiftieth birthday by the author, and on his election as an Honorary Member by the London Mathematical Society. This article reproduces a course of lectures given by the author in the winter semester of 1973 in the Mathematics Faculty of the Moscow State University.
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This article is dedicated to Igor Rostislavovich Shafarevich, on his fiftieth birthday by the author, and on his election as an Honorary Member by the London Mathematical Society. This article reproduces a course of lectures given by the author in the winter semester of 1973 in the Mathematics Faculty of the Moscow State University.
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Mathematical Notes, 1996
This note is the sequel to the author's paper [\textit{N. F. Palinchak}, Math. Notes 55, No. 5, 512-516 (1994); translation from Mat. Zametki 55, No. 5, 110-115 (1994; Zbl 0852.14015)]. Quadrics all of whose linear automorphisms are of the form \(z \mapsto\mu z , w\mapsto |\mu|^2 w, \mu\in\mathbb C \setminus\{0\}\) were called \(c\)-rigid by \textit{V.
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This note is the sequel to the author's paper [\textit{N. F. Palinchak}, Math. Notes 55, No. 5, 512-516 (1994); translation from Mat. Zametki 55, No. 5, 110-115 (1994; Zbl 0852.14015)]. Quadrics all of whose linear automorphisms are of the form \(z \mapsto\mu z , w\mapsto |\mu|^2 w, \mu\in\mathbb C \setminus\{0\}\) were called \(c\)-rigid by \textit{V.
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1998
Abstract IN the projective plane the simplest locus that we can consider, apart from the straight line, is the conic locus, and we have already seen how to establish its projective properties. In three-dimensional projective space, on the other hand, where a point has three degrees of freedom, there are two essentially different kinds of
J G Semple, G T Kneebone
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Abstract IN the projective plane the simplest locus that we can consider, apart from the straight line, is the conic locus, and we have already seen how to establish its projective properties. In three-dimensional projective space, on the other hand, where a point has three degrees of freedom, there are two essentially different kinds of
J G Semple, G T Kneebone
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Some Real Hypersurfaces in Complex and Complex Hyperbolic Quadrics
Bulletin of the Malaysian Mathematical Sciences Society, 2020Juan de Dios Pérez
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Characteristic properties of ellipsoids and convex quadrics
Aequationes Mathematicae, 2019V. Soltan
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