512 research outputs found

    Le corset. Citation du Dr. F. Butin : Le corset. Considérations hygiéniques, A. Maloine édit. Paris 1900

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    Butin Fernand. Le corset. Citation du Dr. F. Butin : Le corset. Considérations hygiéniques, A. Maloine édit. Paris 1900 . In: Sorcières : les femmes vivent, n°17, 1979. Vêtement. p. 26

    Butin, F.

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    BUTIN (29 août 1829)

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    Transcript of BUTIN by anonymous author, appearing in LE CORSAIRE, 29 août 1829, p. 3

    BUTIN (8 août 1829)

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    Transcript of BUTIN by anonymous author, appearing in LE CORSAIRE, 8 août 1829, p. 3

    Marianne Coudry et Michel Humm (Éd.), Praeda. Butin de guerre et société dans la République romaine. Stuttgart, F. Steiner, 2009

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    Torrens Philippe. Marianne Coudry et Michel Humm (Éd.), Praeda. Butin de guerre et société dans la République romaine. Stuttgart, F. Steiner, 2009. In: L'antiquité classique, Tome 81, 2012. pp. 485-488

    Marianne Coudry et Michel Humm (Éd.), Praeda. Butin de guerre et société dans la République romaine. Stuttgart, F. Steiner, 2009

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    Torrens Philippe. Marianne Coudry et Michel Humm (Éd.), Praeda. Butin de guerre et société dans la République romaine. Stuttgart, F. Steiner, 2009. In: L'antiquité classique, Tome 81, 2012. pp. 485-488

    Ascodichaena rugosa Butin

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    Lichen rugosum Linnaeus, Species Plantarum 2: 1140. 1753. "Habitat in Europae, sylvis supra arborum truncos." RCN: 8163. Lectotype (Hawksworth & Punithalingam in Trans. Brit. Mycol. Soc. 60: 503. 1973): [icon] " Lichenoides punctatum & rugosum nigrum" in Dillenius, Hist. Musc.: 125, t. 18, f. 2. 1741. - Epitype (Jørgensen & al. in Bot. J. Linn. Soc. 115: 352, 381. 1994): Herb. Dillenius Tab. XVIII, No. 2, top right specimen (OXF). Current name: Ascodichaena rugosa (Fr.) Butin (Ascodichaenaceae). Note: See review by Jørgensen & al. (in Bot. J. Linn. Soc. 115: 351, 381. 1994).Published as part of Jarvis, Charlie, 2007, Chapter 7: Linnaean Plant Names and their Types (part L), pp. 610-650 in Order out of Chaos. Linnaean Plant Types and their Types, London :Linnaean Society of London in association with the Natural History Museum on page 630, DOI: 10.5281/zenodo.29197

    Corrigendum: Butin H. (2018) Parasitic fungi on leaves of Black Cherry: A contribution to biological plant protection

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    Der ursprüngliche Artikel wurde unter Autorenschaft von Heinz Butin am 01.12.2018 im Journal für Kulturpflanzen 70 (12) S. 342–347, 2018, ISSN 1867-0911, DOI: 10.5073/JfK.2018.12.02 publiziert. Der Pilz Paecilomyces crassipes Butin wurde als neue Art beschrieben und eingeführt. Dies war nicht konform mit Artikel F.5.1 des International Code of Nomenclature for algae, fungi and plants (Turland et al. 2018), denn es fehlte ein Kennungszeichen, das seit dem 1. Januar 2013 obligatorisch ist. Die Art wird nun durch Angabe der unten stehenden MycoBank-Nummer validiert.The original article was published under the authorship of Heinz Butin on 01.12.2018 in Journal für Kulturpflanzen 70 (12) S. 342–347, 2018, ISSN 1867-0911, DOI: 10.5073/JfK.2018.12.02. The fungus Paecilomyces crassipes Butin was described and introduced as a new species. This was not compliant with the International Code of Nomenclature for algae, fungi and plants article F.5.1 (Turland et al. 2018), because a registration identifier was lacking, which is compulsory since 1 January 2013. The species is now validated by providing the MycoBank number below

    COHOMOLOGIE DE HOCHSCHILD DES SURFACES DE KLEIN

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    19 pagesGiven a mechanical system (M,F(M))(M,\,\mathcal{F}(M)), where MM is a Poisson manifold and F(M)\mathcal{F}(M) the algebra of regular functions on MM, it is important to be able to quantize it, in order to obtain more precise results than through classical mechanics. An available method is the deformation quantization, which consists in constructing a star-product on the algebra of formal power series F(M)[[]]\mathcal{F}(M)[[\hbar]]. A first step toward study of star-products is the calculation of Hochschild cohomology of F(M)\mathcal{F}(M).\\ The aim of this article is to determine this Hochschild cohomology in the case of singular curves of the plane --- so we rediscover, by a different way, a result proved by Fronsdal and make it more precise --- and in the case of Klein surfaces. The use of a complex suggested by Kontsevich and the help of Gröbner bases allow us to solve the problem

    HOCHSCHILD COHOMOLOGY OF KLEIN SURFACES

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    19 pagesGiven a mechanical system (M,F(M))(M,\,\mathcal{F}(M)), where MM is a Poisson manifold and F(M)\mathcal{F}(M) the algebra of regular functions on MM, it is important to be able to quantize it, in order to obtain more precise results than through classical mechanics. An available method is the deformation quantization, which consists in constructing a star-product on the algebra of formal power series F(M)[[]]\mathcal{F}(M)[[\hbar]]. A first step toward study of star-products is the calculation of Hochschild cohomology of F(M)\mathcal{F}(M).\\ The aim of this article is to determine this Hochschild cohomology in the case of singular curves of the plane --- so we rediscover, by a different way, a result proved by Fronsdal and make it more precise --- and in the case of Klein surfaces. The use of a complex suggested by Kontsevich and the help of Gröbner bases allow us to solve the problem
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