Thematische Bibliographien / Bernstein

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Auswahl der wissenschaftlichen Literatur zum Thema „Bernstein“

Autor: Grafiati

Veröffentlicht am 4. Juni 2021

Zuletzt aktualisiert am 1. August 2024

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Zeitschriftenartikel zum Thema "Bernstein"

Rodman, Howard A. „Remembering Walter Bernstein“. Film Quarterly 74, Nr. 4 (2021): 43–47. http://dx.doi.org/10.1525/fq.2021.74.4.43.

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Screenwriter Howard Rodman offers a poignant appreciation of Walter Bernstein, the blacklisted screenwriter and director who died in January 2021 at the age of 101. Bernstein had been a fixture in Rodman’s life since the 1950s, when Rodman’s father served as a “front” for Bernstein’s television work. Bernstein would later use that experience as inspiration for The Front (dir. Martin Ritt, 1977), his trenchant and mordantly funny account of life on the blacklist. Rodman surveys Bernstein’s long career, from his years as a journalist for the US Army publication Yank and The New Yorker, to his post-blacklist work of the 1960s and 1970s, to his work at the Sundance Screenwriting Lab, where he and Rodman both served as advisors, closing the circle.

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Bielak, Jan. „Testament Leonarda Bernsteina – The Unanswered Question w świetle zagadnień dyrygenckich“. Kwartalnik Młodych Muzykologów UJ, Nr. 52 (1) (2022): 23–40. http://dx.doi.org/10.4467/23537094kmmuj.22.002.15646.

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Leonard Bernstein’s Testament — The Unanswered Question in the Light of Conducting Issues In 1973, Leonard Bernstein gave a series of six lectures at Harvard University, entitled The Unanswered Question: Six talks at Harvard. This interdisciplinary course, drawing on Noam Chomsky's theory of transformational-generative grammar, presented an original conception of music as a universal language based on tonality and outlined the history of its development, concluding with Bernstein’s personal credo regarding its future. The argumentation used, although encompassing fields as diverse as linguistics, literary studies, philosophy and art history, was based primarily on musical analyses presented at the piano, supplemented by recordings of the symphonic works being discussed, performed under the baton of Bernstein himself. The Harvard lectures thus represent the summa of his aesthetic reflections and performance experiences, providing a unique insight into his views on music and its interpretation. This paper focuses on synthesising these views, subjecting them to factual verification, and then showing their influence on Bernstein's art of conducting through the example of the recordings used in The Unanswered Question series, focusing in particular on the issue of expression.

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MASSEY, DREW. „Leonard Bernstein and the Harvard Student Union: In Search of Political Origins“. Journal of the Society for American Music 3, Nr. 1 (15.01.2009): 67–84. http://dx.doi.org/10.1017/s1752196309090051.

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AbstractIn spite of the publicity generated at times by the politics of the mature Leonard Bernstein, the roots of his entanglement with political causes have been little-explored. As part of a larger collaborative project investigating Bernstein's ties to Boston, this article traces his role in the Harvard Student Union's theatrical productions. These shows were important because they represented some of Bernstein's earliest efforts at writing and directing for the theater. Bernstein worked on two shows sponsored by the Union: the production of Marc Blitzstein'sCradle Will Rockin 1939, during Bernstein's senior year at Harvard, and that of Aristophanes' playPeacein 1941, two years after he graduated. Although the Harvard Student Union was a major progressive political force on campus, Bernstein's relationship with the group appears to have been surprisingly casual. Examination of archival materials surrounding the productions, as well as selected interviews from the larger collaborative Bernstein project of which this article is but one part, reveals Bernstein as a man who was primarily interested in the Harvard Student Union insofar as it was an organization amenable to supporting his musical activities. As the heat of Bernstein's celebrity cools with time, such findings are an important aid in avoiding drawing overly deterministic conclusions about the significance of Bernstein's affiliations while ignoring his own immediate aims, political or otherwise.

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Feng, Yi. „The Epiphany of Language: The Connotation of Zen-Taoism in Charles Bernstein's Echopoetics“. boundary 2 48, Nr. 4 (01.11.2021): 163–83. http://dx.doi.org/10.1215/01903659-9382243.

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Abstract As a prominent representative figure of American Language poetry, Charles Bernstein has incorporated many themes concerning “nothingness” into his poetry. Contrary to the traditional Western philosophy that defines the concept of “nothingness” as meaninglessness and agnosticism, “nothingness” in Bernstein's poetics is endowed with profound poetic and aesthetic implications. Bernstein studied the works of Zen-Taoist philosophy in his early years. Understanding the Zen-Taoist connotations of “nothingness” is an important new dimension in interpreting Bernstein's echopoetics. Bernstein integrates the anti-traditional ideas in Zen-Taoist philosophy and aesthetics with the experiment of American avant-garde poetry. “The transformation between Xu (emptiness) and Shi (Being),” the beauty of “speechlessness,” and the expression of “defamiliarization” show the “epiphany” of language and the “nature” of language. The Chinese traditional Zen-Taoist philosophy is an important part of Bernstein's echopoetics.

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Bernstein, Charles. „Interview with Alí Calderón“. boundary 2 48, Nr. 4 (01.11.2021): 79–82. http://dx.doi.org/10.1215/01903659-9382074.

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Abstract In 2018, Mexican poet Alí Calderón interviewed Charles Bernstein for his influential web magazine Círculo de poesía. The interview is published here in English for the first time. Bernstein addresses the poetics of “hybridity” and the possibilities for poetic disruption. The discussion ends with Bernstein's then new poem, written for John Ashbery on the day he died.

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Resnikoff, Ariel. „A Source Which Is Also a Translation: Toward an Expanded- Yiddish Poetics, with Special Reference to Charles Bernstein“. boundary 2 48, Nr. 4 (01.11.2021): 184–214. http://dx.doi.org/10.1215/01903659-9382257.

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Abstract The present essay contextualizes the poet, scholar, editor, and translator Charles Bernstein (b. 1950), as an artist and practitioner working within a speculative translingual (language-crossing) field and tradition of expanded Yiddish. Reading Bernstein in relation to other expanded-Yiddish figures, such as his elders, Hannah Weiner (1928–77) and Jerome Rothenberg (b. 1931), and ancestor, Walter Benjamin (1892–1940), among others, this essay makes a case for Bernstein as a writer who works from a position of antinomian Jewish translational originlessness, and a diasporic poetics of “need” (à la Charles Reznikoff), in which every source can be understood as a translation and every translation might be treated as a potential source. The coda of the essay addresses the stakes of Bernstein's praxes from the perspective of widespread modern and contemporary anti-Semitism and Jewish self-hatred and concludes with the first ever translation of Bernstein's poetry into Yiddish proper.

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Lang, Abigail. „Bail Out Poetry“. boundary 2 48, Nr. 4 (01.11.2021): 129–37. http://dx.doi.org/10.1215/01903659-9382187.

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Abstract Originally written as an afterword to a book-length translation of poems by Charles Bernstein, this piece was meant to introduce his recent poetry and poetics to a French audience. It does so by pondering the twin economic and nautical senses contained in the title Bernstein suggested for the collection: Poetry Bailout (in French, Renflouer la poésie). What is the value of poetry? What are its uses? These are questions which have underpinned Bernstein's work. In an early essay, adapting a statement by Simone Weil, Bernstein posited that poetry draws its social—or antisocial—power from the fact that “it is ceaselessly creating a scale of values ‘that is not of this world.’” One way it does that is by intensifying the experience of reading. Placing his recent poetics under the aegis of Poe, Bernstein has managed to balance poetry's social and aesthetic functions by cultivating the uses of aesthetics, reconciling pragmatism with unabashed aestheticism.

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Probstein, Ian. „Charles Bernstein: Avant-Garde Is a Constant Renewal“. boundary 2 48, Nr. 4 (01.11.2021): 215–30. http://dx.doi.org/10.1215/01903659-9382271.

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Abstract The essay explores the work of Charles Bernstein in light of constant renewal. John Ashbery, as one of the brightest representatives of the New York School, and Charles Bernstein, as a representative of the language (L = A = N = G = U = A = G = E), have similar attitudes toward language. They have much in common in terms of poetics: in the rejection of loud phrases, prophetic statements, emotions, confessionalism, and certain self-centeredness. Poetry is a private matter for both. Both have poetics built on the “oddness that stays odd,” as Bernstein himself put it, paraphrasing Pound's “news that stays news.” Both are aimed at renovating the language, and the verses of both are built on fragmentation, collage, moving from one statement to another without preparation. However, in Ashbery, whose poems are surreal, these transitions are smoother, based on an apparent connection, what Bernstein calls “hypotaxis” or “associative parataxis.” In contrast, Bernstein's poetry is built on parataxis; it is “bumpy,” in the poet's own words.

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Sirotkina, I. E. „Futurist in Physiology: In Celebration of the 120th Birthday of Nikolai Aleksandrovich Bernstein“. Cultural-Historical Psychology 12, Nr. 4 (2016): 39–47. http://dx.doi.org/10.17759/chp.2016120404.

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The paper is dedicated to the 120th birthday of Nikolai Aleksandrovich Bernstein (1896—1966), a prominent Russian physiologist who contributed also to other fields of knowledge, for instance, cognitive sciences and modeling of biological systems. This study is based on the analysis of various publications and archive materials, including interviews with Bernstein’s disciples conducted by the author in the late 1980s. The paper outlines the ideas and concepts of Bernstein that were well ahead of their time, anticipating research on movement control by at least a hundred years. It also analyses the differences between Bernstein’s theory of movement construction and Pavlov’s theory of conditioned reflex and gives a brief review of the development of Bernstein’s ideas in modern Russian neuroscience. As it is shown, the now popular concept of “kinesthetic imagination” obviously corresponds with Bernstein’s concepts of “movement task” and “model of the desired future”.

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Perloff, Marjorie. „Introduction to Charles Bernstein's Distinguished Wenqin Yao Lectures at Zhejiang University, Hangzhou, Fall 2019“. boundary 2 48, Nr. 4 (01.11.2021): 85–89. http://dx.doi.org/10.1215/01903659-9382102.

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Abstract This brief introduction to Charles Bernstein's work, given in Hangzhou, China, in November 2019, on the occasion of Bernstein's Distinguished Lectureship, discusses the basic principles of Language poetics as put forward in the early books Content's Dream and A Poetics. From the first, Bernstein emphasized the idea that poetry is not the expression of feeling but a constructivist art in which language is taken out of its normal context and recharged. In “Artifice of Absorption,” Bernstein insists that the poet uses all the tools at his command to create a new kind of absorption, arresting the reader's attention. Difficulty is thus inherent to poetry—a difficulty challenging the reader to rise to the challenge of what it means to read poetry. A few examples like “Standing Target” are discussed briefly.

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Dissertationen zum Thema "Bernstein"

Ruviaro, Ricardo. „Teorema de Bernstein“. reponame:Repositório Institucional da UnB, 2007. http://repositorio.unb.br/handle/10482/5527.

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Dissertação (mestrado)—Universidade de Brasília, Instituto de Ciências Exatas, Departamento de Matemática, 2007.
Texto parcialmente liberado pelo autor.
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O presente trabalho de investigação tem como tema o Teorema de Bernstein. Buscou-se como objetivo demonstrar de formas diferentes o Teorema de Bernstein, já que este teorema é um resultado muito extraordinário, pois levando em conta a multiplicidade de soluções que possui a equação de Lagrange, é realmente instigante que o mero fato da solução estar definida para todo (x, y) exclua todas as soluções menos a solução trivial. Far-se-á também a demonstração para o Teorema de do Carmo-Peng e Fischer Colbrie-Schoen. _____________________________________________________________________________ ABSTRACT
In this dissertation. We give three different proofs of the Bernstein theorem and a proof of the theorem of do Carmo-Peng and Fischer Colbrie-Schoen.

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Růžičková, Michaela. „Leonard Bernstein: MASS“. Master's thesis, Akademie múzických umění v Praze.Hudební a taneční fakulta. Knihovna, 2016. http://www.nusl.cz/ntk/nusl-253942.

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This thesis analyzes in detail the work of Leonard Bernstein: MASS. The analysis covers both the theoretical and formal point of view as well as the interpretation issues, while focusing specifically on the issue of interpreting the multi-genre musical work and its definition.

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Varro, Richard. „Algèbres de Bernstein périodiques“. Montpellier 2, 1992. http://www.theses.fr/1992MON20256.

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Dans le but de modéliser des populations dont la composition génétique suit une succession cyclique d'états d'équilibre, nous présentons une généralisation de la notion d'algèbre de Bernstein d'ordre n en introduisant la notion de périodicité. Nous nous sommes intéressés aux conditions d'existence d'idempotents généralisés et à leurs propriétés, à la structure vectorielle qui apparaît lors de la décomposition de Peierce et à des problèmes de transport de structures dans la dupliquée de ces algèbres. Enfin nous étudions les algèbres qui modelisent les populations d'organismes soumises seulement à la mutation des gènes et nous établissons la condition nécessaire et suffisante pour que ces populations atteignent à la première génération une situation d'équilibre périodique

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Landis, Johannes. „Le théâtre d'Henry Bernstein /“. Paris : l'Harmattan, 2009. http://catalogue.bnf.fr/ark:/12148/cb41467448b.

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Gomes, Marlon de Oliveira. „O problema de Bernstein“. reponame:Repositório Institucional da UFC, 2013. http://www.repositorio.ufc.br/handle/riufc/7213.

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GOMES, Marlon de Oliveira. O problema de Bernstein. 2013. 146 f. Dissertação(Mestrado em Matemática) - Centro de Ciências, Universidade Federal do Ceará, Programa de Pós-Graduação em Matemática, Fortaleza, 2013.
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The classical Bernstein problem, solved by S. Bernstein in 1915-1917 in his article [12], asks if there is a complete minimal graph in R3 besides the plane. Bernstein showed that the answer to this question is no using analytical methods for study of equations of prescribed curvature. We will see here how this problem is related to the Gauss map of the graph, and as consequence of this relationship we generalize this theorem to a larger class of surfaces (not necessarily graphs), following the proof given by R. Osserman in [51]. We will see next generalizations of this theorem in higher dimensions, following essentially the methods introduced by W. Fleming in [31], and later refined by E. De Giorgi in [20], F. Almgren in [6] and J. Simons in [62]. In fact, they solve the problem for graphs in Rn, n < 9, namely they prove that the only complete minimal graph in these espaces is the hyperplane. Following the proof given by E. Bombieri, E. De Giorgi and E. Giusti in [14], we also show that, in dimension n ≥ 9, it is possible to construct complete minimal graphs in Rn. At last, we conclude with an extension of Bernstein’s theorem to the class of submanifolds stable with respect to the second variation of volume, under certain conditions of curvature and volume growth, and yet we investigate the case in which the ambient manifold is not the Euclidean space.
O problema de Bernstein clássico, resolvido por S. Bernstein em 1915-1917 em seu artigo [12], pergunta se existe um gráfico mínimo completo em R3 além do plano. Bernstein mostrou que a resposta para este problema é não, utilizando métodos analíticos para o estudo de equações de curvatura prescrita. Veremos aqui como este problema está relacionado com a aplicação de Gauss deste gráfico, e como conseqüência desta relação iremos generalizar este teorema para uma classe de superfícies maior (não necessariamente gráficos), seguindo a prova dada por R. Osserman em [51]. Veremos a seguir generalizações deste teorema em dimensões maiores, seguindo essencialmente os métodos introduzidos Por W. Fleming em [31], e refinados posteriormente por E. De Giorgi, em [20], F. Almgren, em [6], e J. Simons, em [62], que resolvem o problema para gráficos em Rn, n < 9 mostrando que o único gráfico mínimo completo nesses espaços é o hiperplano. Mostraremos também que em dimensão n ≥ 9, é possível construir gráficos mínimos completos em Rn, seguindo a prova apresentada por E. Bombieri, E. Di Giorgi e E. Giusti em [14]. Por fim, concluímos com uma extensão do teorema de Bernstein para a classe das subvariedades estáveis com respeito à segunda variação de volume, sob certas condições de crescimento de curvatura ou volume, e investigaremos ainda o caso que a variedade ambiente não é o espaço euclidiano.

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Jeberien, Alexandra. „Archäologischer Bernstein Untersuchung verschiedener Festigungsmöglichkeiten /“. [Berlin] : [S.n.], 2000. https://sisis.rz.fhtw-berlin.de/inhalt/0122027.pdf.

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Zitan, Fouad. „Sur les algèbres de Bernstein“. Grenoble 2 : ANRT, 1987. http://catalogue.bnf.fr/ark:/12148/cb376109529.

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Piazzon, Federico. „Bernstein Markov Properties and Applications“. Doctoral thesis, Università degli studi di Padova, 2016. http://hdl.handle.net/11577/3424517.

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The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E is a strong comparability assumption between L μ 2 and uni- form norms on E of polynomials (or other nested families of functions) as their degree tends to infinity. Admissible meshes are sequences of sampling sets A k ⊂ E whose cardinality is growing sub-exponentially with respect to k and for which there exists a positive finite constant C such that max E |p| ≤ C max A k |p| for any polynomial of degree at most k. These two mathematical objects have several applications and motivations from Approximation Theory and Pluripotential Theory, the study of plurisubharmonic functions in several complex variables. The properties of Bernstein Markov measures and admissible meshes for a given compact set E are very similar, indeed they may be seen as the continuous and the discrete approach to the same problem. This work is concerned on providing sufficient conditions for some different instances of the Bernstein Markov property and explicitly constructing admissible meshes. As first problem, we study sufficient conditions for a version of the Bernstein Markov property for rational functions on the complex plane and its relation with the polynomial Bernstein Markov property. In Chapter 5, we consider the case of a compact subset E of an algebraic pure m-dimensional subset A of C n and we prove a sufficient condition for the Bernstein Markov property for the traces of polynomials on E. To this aim, we provide two new results in Pluripotential Theory regarding the convergence and the comparability of the relative capacities, the relative and global extremal functions and the Chebyshev constants on a (possibly non-smooth) pure m-dimensional algebraic variety in C n , which are of independent interest. In the last part of the dissertation, we provide some construction procedures for admissible meshes on some classes of real compact sets. Finally, we present some algorithms, based on admissible meshes, for the numerical approximation of the most relevant objects in Pluripotential Theory, namely, the transfinite diameter, the Siciak Zaharjuta extremal function and the pluripotential equilibrium measure.
La proprietà di Bernstein Markov per un compatto E ed una misura positiva finita μ avente supporto in E è un’ assunzione di comparabilità asintotica tra le norme uniformi ed L μ 2 dei polinomi di grado al più k (o altre famiglie innestate di funzioni) al tendere all’ infinito di k. Le Admissible Meshes sono sequenze di sottoinsiemi finiti A k del compatto E la cui cardinalità cresce in modo subesponenziale rispetto a k e per i quali esiste una costante positiva C tale che max E |p| ≤ C max A k |p| per ogni polinomi di grado al più k. Questi due oggetti matematici hanno molte appliicazioni e motivazioni prove- nienti dalla Teoria dell’ Approssimazione e dalla Teoria del Pluripotenziale, lo stu- dio delle funzioni plurisubarmoniche in più variabili complesse. Le proprietà delle misure di Bernstein Markov e delle admissible meshes per un dato compatto E sono molto simili, infatti le due definizioni possono essere viste come gli approcci rispettivamente continuo e discreto dello stesso problema. Questo lavoro si concentra nel fornire condizioni sufficienti per la proprietà di Bernstein Markov in diverse situazioni e nella costruzione esplicita di admissible meshes. Come primo problema vengono studiate condizioni sufficienti per una versione della proprietà di Bernstein Markov per successioni di funzioni razionali nel piano complesso in relazione alla stessa proprietà per i polinomi. Nel Capitolo 5 viene considerato il caso di un compatto E sottoinsieme di una varietà algebrica A ⊂ C n di dimensione pura m < n ed irriducibile e quindi provata una condizione sufficiente per la proprietà di Bernstein Markov per le tracce dei polinomi su E. A questo scopo vengono provati due risultati nuovi in Teoria del Pluripoten- ziale riguardanti la convergenza e la comparabilità della capacità relativa (di Monge Ampère), delle funzioni plurisubarmoniche estremali globali e relative e delle co- stanti di Chebyshev per sottoinsiemi E j di un dato compatto E della varietà alge- brica A, anche nel caso A sia singolare. Tali risultati sono di interesse indipendente. Nell’ultima parte della tesi vengono provate ed illustrate alcune procedure per la costruzione di admissible meshes per alcune classi di compatti reali. In ultimo vengono presentati alcuni nuovi algoritmi, basati sulle admissible meshes, per l’ approssimazione numerica delle più rilevanti grandezze in Teoria del Pluripotenziale: il diametro transfinito, la funzione estremale di Siciak-Zaharjuta e la misura di equilibrio pluripotenziale.

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Sadik, Mohamed. „Inégalités de Markov-Bernstein en L2 : les outils mathématiques d'encadrement de la constante de Markov-Bernstein“. Phd thesis, INSA de Rouen, 2010. http://tel.archives-ouvertes.fr/tel-00557914.

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Les travaux de recherche de cette thèse concernent l'encadrement de la constante de Markov Bernstein pour la norme L2 associée aux mesures de Jacobi et Gegenbauer généralisée. Ce travail est composé de deux parties : dans la première partie, nous avons développé une généralisation de l'algorithme qd pour les matrices symétriques définies positives à largeur de bande $\ell$ et nous avons construit l'algorithme qd pour les matrices de Jacobi par blocs. Ensuite, nous l'avons généralisé aux cas des matrices par bloc à largeur de bande $\ell$. Ces algorithmes nous permettent de trouver un majorant de la constante. Enfin, nous avons développé le déterminant caractéristique d'une matrice symétrique définie positive pentadiagonale, ce qui nous permet d'obtenir un minorant de la constante en utilisant la méthode de Newton. La deuxième partie est consacrée à l'application de tous les outils développés à l'encadrement de la constante de Markov Bernstein pour la norme L2 associée à la mesure de Gegenbauer généralisée.

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Oruç, Halil. „Generalized Bernstein polynomials and total positivity“. Thesis, University of St Andrews, 1999. http://hdl.handle.net/10023/11183.

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This thesis deals mainly with geometric properties of generalized Bernstein polynomials which replace the single Bernstein polynomial by a one-parameter family of polynomials. It also provides a triangular decomposition and 1-banded factorization of the Vandermonde matrix. We first establish the generalized Bernstein polynomials for monomials, which leads to a definition of Stirling polynomials of the second kind. These are q-analogues of Stirling numbers of the second kind. Some of the properties of the Stirling numbers are generalized to their q-analogues. We show that the generalized Bernstein polynomials are monotonic in degree n when the function ƒ is convex ... Shape preserving properties of the generalized Bernstein polynomials are studied by making use of the concept of total positivity. It is proved that monotonic and convex functions produce monotonic and convex generalized Bernstein polynomials. It is also shown that the generalized Bernstein polynomials are monotonic in the parameter q for the class of convex functions. Finally, we look into the degree elevation and degree reduction processes on the generalized Bernstein polynomials.

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Bücher zum Thema "Bernstein"

1938-, Davies Brian, Muller Johan und Morais Ana 1939-, Hrsg. Reading Bernstein, researching Bernstein. London: RoutledgeFalmer, 2004.

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Juhász, Előd. Bernstein és Budapest: Bernstein story II. [Budapest]: Szabad Tér, 1988.

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Clark, Neil D. L. Mythos Bernstein. Darmstadt: Wiss. Buchges., 2012.

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Venezia, Mike. Leonard Bernstein. New York: Children's Press, 1997.

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Burton, Humphrey. Leonard Bernstein. London: Faber and Faber, 1995.

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Venezia, Mike. Leonard Bernstein. New York: Children's Press, 1997.

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Jane, Fluegel, Hrsg. Bernstein remembered. New York: Carroll & Graf, 1991.

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B, Haws Barbara, Hrsg. Leonard Bernstein. New York: Collins, 2008.

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Freedland, Michael. Leonard Bernstein. London: Harrap, 1987.

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Burton, Humphrey. Leonard Bernstein. London: Faber, 1994.

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Mehr Quellen

Buchteile zum Thema "Bernstein"

Lubinsky, Doron S., und Edward B. Saff. „Bernstein's formula and bernstein extremal polynomials“. In Strong Asymptotics for Extremal Polynomials Associated with Weights on ℝ, 111–19. Berlin, Heidelberg: Springer Berlin Heidelberg, 1988. http://dx.doi.org/10.1007/bfb0082426.

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Yang, Jingping, Fang Wang und Zongkai Xie. „Bernstein Copulas and Composite Bernstein Copulas“. In Mathematical Lectures from Peking University, 183–217. Singapore: Springer Singapore, 2020. http://dx.doi.org/10.1007/978-981-15-1576-7_4.

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Bernad, J., A. Iltyakov und C. Martinez. „Bernstein Representations“. In Non-Associative Algebra and Its Applications, 39–45. Dordrecht: Springer Netherlands, 1994. http://dx.doi.org/10.1007/978-94-011-0990-1_7.

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Kurth, Ulrich. „Bernstein, Leonard“. In Metzler Komponisten Lexikon, 68–69. Stuttgart: J.B. Metzler, 1992. http://dx.doi.org/10.1007/978-3-476-03421-2_21.

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Fülberth, Georg. „Bernstein, Eduard“. In Metzler Philosophen Lexikon, 114–15. Stuttgart: J.B. Metzler, 1995. http://dx.doi.org/10.1007/978-3-476-03642-1_42.

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Kurth, Ulrich. „Bernstein, Leonard“. In Komponisten Lexikon, 53–54. Stuttgart: J.B. Metzler, 2003. http://dx.doi.org/10.1007/978-3-476-05274-2_21.

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Ostrowski, Marius S. „Bernstein, Eduard“. In Encyclopedia of the Philosophy of Law and Social Philosophy, 268–72. Dordrecht: Springer Netherlands, 2023. http://dx.doi.org/10.1007/978-94-007-6519-1_902.

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Phillips, George M. „Bernstein Polynomials“. In CMS Books in Mathematics, 247–90. New York, NY: Springer New York, 2003. http://dx.doi.org/10.1007/0-387-21682-0_7.

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DeVore, Ronald A., und George G. Lorentz. „Bernstein Polynomials“. In Grundlehren der mathematischen Wissenschaften, 303–32. Berlin, Heidelberg: Springer Berlin Heidelberg, 1993. http://dx.doi.org/10.1007/978-3-662-02888-9_10.

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Bottomore, Tom. „Eduard Bernstein“. In Marxian Economics, 55–58. London: Palgrave Macmillan UK, 1990. http://dx.doi.org/10.1007/978-1-349-20572-1_7.

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Konferenzberichte zum Thema "Bernstein"

Номати, М. „Эволюция взглядов С. Б. Бернштейна на кашубский вопрос“. In Межкультурное и межъязыковое взаимодействие в пространстве Славии (к 110-летию со дня рождения С. Б. Бернштейна). Институт славяноведения РАН, 2021. http://dx.doi.org/10.31168/0459-6.22.

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Annotation:

Samuil B. Bernstein was one of the most renowned Soviet and Russian Slavists, who had an unmatched scholarly breadth and depth and was interested in all aspects of Slavic linguistics. Though he was famous as a specialist in the South Slavic languages and Slavic historical and comparative grammar, he was equally interested in West Slavic languages, particularly in Polish, including Kashubian. In his lifetime, Bernstein did not write much about Kashubian, but from little that he wrote, it seems clear that he changed his views toward Kashubian several times. In this presentation, I will analyze Bernstein’s published and unpublished materials in order to establish at what points in his career, and for what reasons, he changed his views on Kashubian.

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Mnih, Volodymyr, Csaba Szepesvári und Jean-Yves Audibert. „Empirical Bernstein stopping“. In the 25th international conference. New York, New York, USA: ACM Press, 2008. http://dx.doi.org/10.1145/1390156.1390241.

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Zhang, Chun-Gou, und Chun-Juan Yang. „Fuzzy Bernstein Type Inequalities“. In 2016 International Conference on Computer Engineering and Information Systems. Paris, France: Atlantis Press, 2016. http://dx.doi.org/10.2991/ceis-16.2016.63.

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Wu, Xuezhi, und Wenjuan Zhong. „Fuzzy q-Bernstein polynomials“. In 2012 9th International Conference on Fuzzy Systems and Knowledge Discovery (FSKD). IEEE, 2012. http://dx.doi.org/10.1109/fskd.2012.6233924.

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Valasek, Gábor. „Rootfinding in Bernstein Basis“. In CAD'24. U-turn Press LLC, 2024. http://dx.doi.org/10.14733/cadconfp.2024.334-338.

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Ram, A. K. „Emission of electron Bernstein waves“. In RADIO FREQUENCY POWER IN PLASMAS:14th Topical Conference. AIP, 2001. http://dx.doi.org/10.1063/1.1424226.

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Schmeisser, Gerhard. „Real zeros of Bernstein polynomials“. In Third CMFT Conference. WORLD SCIENTIFIC, 1999. http://dx.doi.org/10.1142/9789812833044_0038.

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Shevchenko, V., G. Cunningham, A. Gurchenko, E. Gusakov, B. Lloyd, M. O'Brien, A. Saveliev et al. „Electron Bernstein Wave Studies in MAST“. In RADIO FREQUENCY POWER IN PLASMAS: 17th Topical Conference on Radio Frequency Power in Plasmas. AIP, 2007. http://dx.doi.org/10.1063/1.2800503.

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Seltzman, Andrew H., Jay K. Anderson, Paul D. Nonn, Jason X. Kauffold, Stephanie J. Diem, Cary B. Forest, Cynthia K. Phillips und James R. Wilson. „Electron Bernstein Wave Studies in MST“. In RADIO FREQUENCY POWER IN PLASMAS: Proceedings of the 19th Topical Conference. AIP, 2011. http://dx.doi.org/10.1063/1.3665020.

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GRANGER, MICHEL. „BERNSTEIN-SATO POLYNOMIALS AND FUNCTIONAL EQUATIONS“. In Algebraic Approach to Differential Equations. WORLD SCIENTIFIC, 2010. http://dx.doi.org/10.1142/9789814273244_0006.

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Berichte der Organisationen zum Thema "Bernstein"

Chen, K. R. Fast ion-driven Bernstein instabilities. Office of Scientific and Technical Information (OSTI), Juli 1992. http://dx.doi.org/10.2172/7182388.

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Ono, Masayuki. Ion Bernstein wave heating research. Office of Scientific and Technical Information (OSTI), März 1992. http://dx.doi.org/10.2172/5522759.

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Ono, Masayuki. Ion Bernstein wave heating research. Office of Scientific and Technical Information (OSTI), März 1992. http://dx.doi.org/10.2172/10132056.

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Chen, K. R. Fast ion-driven Bernstein instabilities. Office of Scientific and Technical Information (OSTI), Juli 1992. http://dx.doi.org/10.2172/10172495.

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G. Taylor, P. Efthimion, B. Jones, T. Munsat, J. Spaleta, J. Hosea, R. Kaita, R. Majeski und J. Menard. Electron Bernstein wave electron temperature profile diagnostic. Office of Scientific and Technical Information (OSTI), Juli 2000. http://dx.doi.org/10.2172/758660.

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Quan, Michael, und Steven Walton. Arbitrary-order Bernstein basis functions for Lagrangian Hydrodynamics. Office of Scientific and Technical Information (OSTI), August 2022. http://dx.doi.org/10.2172/1883100.

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Taylor, G., P. C. Efthimion, B. Jones, J. C. Hosea, R. Kaita, B. P. LeBlanc, R. Majeski et al. Electron Bernstein Wave Research on CDX-U and NSTX. Office of Scientific and Technical Information (OSTI), Mai 2001. http://dx.doi.org/10.2172/784554.

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G. Taylor, P.C. Efthimion, B. Jones, G.L. Bell, A. Bers, T.S. Bigelow, M.D. Carter et al. Electron Bernstein Wave Research on NSTX and CDX-U. Office of Scientific and Technical Information (OSTI), Juni 2003. http://dx.doi.org/10.2172/814023.

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Ignat, D. W., und M. Ono. Hot-ion Bernstein wave with large k{sub parallel}. Office of Scientific and Technical Information (OSTI), Januar 1995. http://dx.doi.org/10.2172/10110815.

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G. Taylor, A. Bers, T.S. Bigelow, M.D. Carter, J.B. Caughman, J. Decker, S. Diem et al. Electron Bernstein Wave Research on the National Spherical Torus Experiment. Office of Scientific and Technical Information (OSTI), April 2005. http://dx.doi.org/10.2172/839173.

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