1,276 research outputs found

    Bernstein, Basil, Class, Codes and Control: Volume 3, Towards a Theory of Educational Transmissions. Revised Edition. London: Routledge & Kegan Paul, 1977.

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    Presents a series of Bernstein\u27s papers on changes in the moral basis of schools and changes in the coding of educational transmissions; chapter five presents the author\u27s classic conceptualizations of classification and framing of educational knowledge

    The Iconography of Structure: The Social and Aesthetic Dimensions of the Flying Buttress

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    Review of Maile S. Hutterer, Framing the Church: The Social and Artistic Power of Buttresses in French Gothic Architecture. Part of Kaminer, T., Bernstein, M., Fitzner, S. and Williams, R.J., 2020. Reviews Fall 2020. Architectural Histories, 8(1), p.21. DOI: http://doi.org/10.5334/ah.55

    Jane Bernstein, 21st Annual ODU Literary Festival

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    Jane Bernstein is the author of Departures, a novel, Loving Rachel, a memoir, and Seven Minutes in Heaven, a young-adult novel based on a screenplay she co-wrote for a Warner Brothers movie of the same name. Her essays and short fiction have been published in such places as The New York Times Magazine, Creative Nonfiction, Glamour, Poets & Writers and Prairie Schooner. Recent projects include a screenplay based on the life of voting rights activist Fannie Lou Hamer for director Jonathan Kaplan, and an adaptation of the Kaye Gibbons novel A Cure for Dreams for Firebird Films. Honors include a National Endowment Fellowship in Creative Writing, a Pennsylvania State Council on the Arts Fellowships in Media Arts, and two New Jersey State Council of the Arts Fellowship in Fiction. She has just completed a book called Twilight Time – A Murder and its Aftermath, which is about her sister’s murder in 1996 and its repercussions for her family. Jane received her master of fine arts from Columbia University and is an associate professor of English and Creative Writing at Carnegie Mellon University in Pittsburgh, Pennsylvania

    The Bernstein Problem in Dimension 6

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    AbstractThe solution of the Bernstein problem in the regular and exceptional cases, in all dimensionsn, was made by Yu. Lyubich. A. Grishkov proved that there are no nonregular nonexceptional nuclear Bernstein algebras of type (4,2) with stochastic realization and therefore the Bernstein problem of type (4,2) was completely solved by the present author (J. Algebra, to appear). The aim of this paper is to describe explicitly all simplicial stochastic nonexceptional nonregular Bernstein algebras of type (3,3). Since every nonregular nonexceptional Bernstein algebra of dimension 6 is either of type (4,2) or of type (3,3), the Bernstein problem in dimension 6 is completely solved in this paper

    A survey of results on the q-Bernstein polynomials

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    It is now nearly a century since S. N. Bernstein introduced his well-known polynomials. This paper is concerned with generalizations of the Bernstein polynomials, mainly with the so called q-Bernstein polynomials. These are due to the author of this paper and are based on the q integers. They reduce to the Bernstein polynomials when we put q = 1 and share the shape-preserving properties of the Bernstein polynomials when q is an element of (0, 1). This paper also describes another earlier generalization of the Bernstein polynomials, a sequence of rational functions that are also based on the q-integers, proposed by A. Lupas, and two even earlier generalizations due to D. D. Stancu. The present author summarizes various results, due to a number of authors, that are concerned with the q-Bernstein polynomials and with Stancu's two generalizations.</p

    Differentiated Bernstein Type Operators

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    ARAL, Ali/0000-0002-2024-8607The present paper deals with the derivatives of Bernstein type operators preserving some exponential functions. We investigate the uniform convergence of the differentiated operators. The rate of convergence by means of a modulus of continuity is studied, an upper estimate theorem for the difference of new constructed differentiated Bernstein type operators is presented.TUBITAK (The Scientific and Technological Research Council of Turkey)Turkiye Bilimsel ve Teknolojik Arastirma Kurumu (TUBITAK) [1002, 119F191]; TUBITAKTurkiye Bilimsel ve Teknolojik Arastirma Kurumu (TUBITAK)1. The second author has been supported within TUBITAK (The Scientific and Technological Research Council of Turkey) 1002 -Project 119F191 and the third author would like to thank to TUBITAK for their financial supports during his PhD studies

    Uniform approximation by Bernstein-type operators

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    AbstractThe author solves the saturation and so called non-optimal approximation problem for a Bernstein-type approximation process defined by Bleimann, Butzer and Hahn

    Mitigating urban sprawl effects: a collaborative tree and shade intervention in Phoenix, Arizona, USA.

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    abstract: Communities in Phoenix are confronted with numerous challenges that adversely affect human health and safety, with disproportionate impacts on low-income communities. While some challenges are being addressed at the city level, new alliances at the neighbourhood level are initiating community development programmes and projects. This article reports on an intervention study carried out in collaboration with community representatives, city staff, and non-profit organisations to mitigate adverse effects of urban sprawl in the Sky Harbour Neighbourhood in Phoenix. Participatory research was conducted to design and test a tree and shade intervention. Challenges associated with navigating community desires and broader principles of sustainable development are discussed. The study offers a replicable and adaptable intervention research design aimed at empowering communities to meet urban challenges.Corresponding Author: Michael J. Bernstein Arizona State University [email protected]
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