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Regularity of Conjugacies of Linearizable Generalized Interval Exchange Transformations. [PDF]
Commun Math PhysGhazouani S, Ulcigrai C.
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Oberwolfach Reports, 2011
Combinatorics is a fundamental mathematical discipline which focuses on the study of discrete objects and their properties. The current workshop brought together researchers from diverse fields such as Extremal and Probabilistic Combinatorics, Discrete Geometry, Graph theory, Combinatorial Optimization and Algebraic Combinatorics for a fruitful ...
Jeff Kahn +2 more
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Combinatorics is a fundamental mathematical discipline which focuses on the study of discrete objects and their properties. The current workshop brought together researchers from diverse fields such as Extremal and Probabilistic Combinatorics, Discrete Geometry, Graph theory, Combinatorial Optimization and Algebraic Combinatorics for a fruitful ...
Jeff Kahn +2 more
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Oberwolfach Reports, 2004
The workshop Combinatorics organised by László Lovász (Redmond) and Hans Jürgen Prömel (Berlin) was held January 1st–January 7th, 2006. This meeting was very well attended with 48 participants from many different countries. The programme consisted of 15 plenary lectures, accompanied by 18 shorter contributions and
Laszlo Lovasz, Hans Jürgen Prömel
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The workshop Combinatorics organised by László Lovász (Redmond) and Hans Jürgen Prömel (Berlin) was held January 1st–January 7th, 2006. This meeting was very well attended with 48 participants from many different countries. The programme consisted of 15 plenary lectures, accompanied by 18 shorter contributions and
Laszlo Lovasz, Hans Jürgen Prömel
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The Combinatorics of Cases [PDF]
Research on Language and Computation, 2003 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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SIAM Review, 1974
Summary: This is an expository paper on some connections between coding theory and combinatorial mathematics (and number theory). A long introduction to linear codes is followed by short sections on perfect codes, \(t\)-designs, sphere packings, simple groups, lattices, and theta-functions, and projective planes.
H. F. Mattson, E. F. Assmus
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Summary: This is an expository paper on some connections between coding theory and combinatorial mathematics (and number theory). A long introduction to linear codes is followed by short sections on perfect codes, \(t\)-designs, sphere packings, simple groups, lattices, and theta-functions, and projective planes.
H. F. Mattson, E. F. Assmus
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ZAMP Zeitschrift f�r angewandte Mathematik und Physik, 1985
(From authors' summary.) Combinatorial identities, trigonometric formulas, together with complex variable techniques are used to derive exact and closed expressions for the six flexure functions of certain isotropic cylinders under flexure. The cross sections are bounded either by the closed curves \(r=\alpha \cos^ n(\theta /n)\) \((-\pi
Samih Obaid, D. C. Rung
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(From authors' summary.) Combinatorial identities, trigonometric formulas, together with complex variable techniques are used to derive exact and closed expressions for the six flexure functions of certain isotropic cylinders under flexure. The cross sections are bounded either by the closed curves \(r=\alpha \cos^ n(\theta /n)\) \((-\pi
Samih Obaid, D. C. Rung
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