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CONVERGENCE UNDER STEINER SYMMETRIZATIONLuttmann, Frederick William, 1940- January 1967 (has links)
No description available.
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Neuorientierung des Staatsbewusstseins die Staatsauffassung Wilhelm von Humboldts und die Erweiterung ihrer Anregungen durch Rudolf Steiner /Ibing, Arnold, January 1900 (has links)
Thesis (doctoral)--Freie Universität Berlin, 1979. / Bibliography: p. 205-216.
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Der Chronist Werner Steiner, 1492-1542; ein Beitrag zur Reformationsgeschichte von Zug.Meyer, Wilhelm. January 1910 (has links)
Inaug.-Diss.--Freiburg i.d. Schweiz. / "Separatabzug aus Band 65 des Geschichtsfreundes; Mitteilungen des historischen Vereins der fünf Orte Luzern, Uri, Schwyz, Unterwalden und Zug." Includes bibliographical references.
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The social organisation of everyday therapeutic work in a Camphill Rudolf Steiner therapeutic communityMcKeganey, Neil P. January 1982 (has links)
No description available.
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Steiner systems of the Mathieu Group M₁₂Dillard, Kristin Marie 01 January 2000 (has links)
A Steiner system T with parameters (5,6,12) is a collection of 6-element sets, called hexads, of a 12-element set [omega], such that any 5 of the 12 elements belong to exactly one hexad. In this project we construct a graph whose vertices are the orbits of S₁₂ on T x T, where T is the set of all Steiner systems S(5,6,12). Two vertices are joined if an orbit is taken into another under the action of a transposition. The number of hexads common to two Steiner systems are also given. We also prove that any two Steiner systems with parameters (5,6,12) can intersect only in 0, 12, 24, 36, or 60 hexads.
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Geometric Steiner minimal treesDe Wet, Pieter Oloff 31 January 2008 (has links)
In 1992 Du and Hwang published a paper confirming the correctness of a well
known 1968 conjecture of Gilbert and Pollak suggesting that the Euclidean
Steiner ratio for the plane is 2/3. The original objective of this thesis was to
adapt the technique used in this proof to obtain results for other Minkowski
spaces. In an attempt to create a rigorous and complete version of the proof,
some known results were given new proofs (results for hexagonal trees and
for the rectilinear Steiner ratio) and some new results were obtained (on
approximation of Steiner ratios and on transforming Steiner trees).
The most surprising result, however, was the discovery of a fundamental
gap in the proof of Du and Hwang. We give counter examples demonstrating
that a statement made about inner spanning trees, which plays an important
role in the proof, is not correct. There seems to be no simple way out of
this dilemma, and whether the Gilbert-Pollak conjecture is true or not for
any number of points seems once again to be an open question. Finally we
consider the question of whether Du and Hwang's strategy can be used for
cases where the number of points is restricted. After introducing some extra
lemmas, we are able to show that the Gilbert-Pollak conjecture is true for 7
or fewer points. This is an improvement on the 1991 proof for 6 points of
Rubinstein and Thomas. / Mathematical Sciences / Ph. D. (Mathematics)
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Problema de Steiner Euclidiano aplicado a moléculas de interesse biológicoAmorim Neto, Alcides de Castro 26 May 2007 (has links)
Made available in DSpace on 2015-04-22T22:16:13Z (GMT). No. of bitstreams: 1
Alcides de Castro Amorim Neto.pdf: 1160215 bytes, checksum: 9d45c01bd11518c19b4c0577a41c7455 (MD5)
Previous issue date: 2007-05-26 / CAPES - Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / An old problem and of great application in the Applied Mathematics is known as problem of Steiner, with consists of the determination of a point that minimizes certain distances, problem this that was studied by famous mathematical
as Fermat and Torricelli. A fundamental result in biochemistry and molecular modelling is the determination of the configurations of minimum energy (MECs) for structures such macromoleculares like proteins and DNA. The Steiner minimal trees (SMT) are seen as a useful algorithm paradigm
to model these structures. In this work, we will examine how SMTs and the value of the ratio Steiner (½) compared with the MSTs are correlated with the energies MECs in a way physically significant. We verified that carbon and nitrogen atoms are Steiner points in the proteins minimal Steiner trees. / Um problema antigo e de grande aplicação na Matemática Aplicada é conhecido como problema de Steiner, que consiste na determinação de um ponto que minimize certas distâncias, problema este que foi estudado por outros matemáticos renomados como Fermat e Torricelli. Um dos resultados
fundamentais em bioquímica e modelagem molecular é a determinação das Configurações de Energia Mínima (MECs) para estruturas macromoleculares tais como proteínas e DNA. As árvores mínimas de Steiner (SMTs) servem de base para elaboração de algoritmos úteis para modelar estas estruturas.
Nesta dissertação, faremos uma revisão bibliográfica sobre o problema de Steiner e verificaremos, através de resultados da literatura, como as SMTs e o valor da razão de Steiner (½) comparado com as árvores geradoras mínimas MSTs estão correlacionadas com as MECs de uma maneira fisicamente
significativa. Uma das observações relevantes é que os átomos de carbono e nitrogênio atuam como pontos de Steiner nas árvores mínimas de Steiner das proteínas.
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Geometric Steiner minimal treesDe Wet, Pieter Oloff 31 January 2008 (has links)
In 1992 Du and Hwang published a paper confirming the correctness of a well
known 1968 conjecture of Gilbert and Pollak suggesting that the Euclidean
Steiner ratio for the plane is 2/3. The original objective of this thesis was to
adapt the technique used in this proof to obtain results for other Minkowski
spaces. In an attempt to create a rigorous and complete version of the proof,
some known results were given new proofs (results for hexagonal trees and
for the rectilinear Steiner ratio) and some new results were obtained (on
approximation of Steiner ratios and on transforming Steiner trees).
The most surprising result, however, was the discovery of a fundamental
gap in the proof of Du and Hwang. We give counter examples demonstrating
that a statement made about inner spanning trees, which plays an important
role in the proof, is not correct. There seems to be no simple way out of
this dilemma, and whether the Gilbert-Pollak conjecture is true or not for
any number of points seems once again to be an open question. Finally we
consider the question of whether Du and Hwang's strategy can be used for
cases where the number of points is restricted. After introducing some extra
lemmas, we are able to show that the Gilbert-Pollak conjecture is true for 7
or fewer points. This is an improvement on the 1991 proof for 6 points of
Rubinstein and Thomas. / Mathematical Sciences / Ph. D. (Mathematics)
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Valid Inequalities and Facets for the Steinger Problem in a Directed GraphMyung, Young-soo 06 1900 (has links)
In this paper, we describe the facial structure of the steiner problem in a directed graph by formulating it as a set covering problem. We first characterize trivial facets and derive a necessary condition for nontrivial facets. We also introduce a class of valid inequalities with 0-1 coefficients and show when such inequalities define facets.
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Anthropology as memory : Elias Canetti's and Franz Baermann Steiner's responses to the Shoah /Mack, Michael. January 2001 (has links)
Diss.--Philos.--Oxford--University of Oxford. / Bibliogr. p. 205-226. Index.
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