183,040 research outputs found

    Sr. Federico R. Pfister

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    El Sr. Federico R. Pfister fue el Presidente del Centro de Estudiantes de Ciencias Económicas en 193

    R. Pfister. — Textiles de Palmyre

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    Dussaud René. R. Pfister. — Textiles de Palmyre. In: Syria. Tome 16 fascicule 3, 1935. pp. 304-305

    R. Pfister. — Textiles de Palmyre

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    Dussaud René. R. Pfister. — Textiles de Palmyre. In: Syria. Tome 23 fascicule 1-2, 1942. pp. 112-113

    F. Pfister s/m R. Rahn z. freundl. Erinnerung

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    Dedikationssilhouette nach links von F. Pfister, gewidmet Johann Rudolf Rahn (1841-1912)Anonyme/r Künstler/inHandschriftliche Widmung unterhalb des Porträts "F. Pfister s[eine]m R. Rahn z[ur] freundl[ichen] Erinnerung

    R. Pfister. — Textiles de Halablyeh (Zenobia)

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    Dussaud René. R. Pfister. — Textiles de Halablyeh (Zenobia). In: Syria. Tome 29 fascicule 1-2, 1952. pp. 157-158

    R. Pfister. — Textiles de Halablyeh (Zenobia)

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    Dussaud René. R. Pfister. — Textiles de Halablyeh (Zenobia). In: Syria. Tome 29 fascicule 1-2, 1952. pp. 157-158

    R script_SEM_PO.R

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    R script for the structural equation model published in Pfister et al. (2018) Dominance of cropland reduces the pollen deposition from bumble bees. Scientific ReportsDOI : 10.1038/s41598-018-31826-

    Pfister involutions

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    The question of the existence of an analogue, in the framework of central simple algebras with involution, of the notion of Pfister form is raised. In particular, algebras with orthogonal involution which split as a tensor product of quaternion algebras with involution are studied. It is proven that, up to degree 16, over any extension over which the algebra splits, the involution is adjoint to a Pfister form. Moreover, cohomological invariants of those algebras with involution are discusse

    Pfister involutions

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    The question of the existence of an analogue, in the framework of central simple algebras with involution, of the notion of Pfister form is raised. In particular, algebras with orthogonal involution which split as a tensor product of quaternion algebras with involution are studied. It is proven that, up to degree 16, over any extension over which the algebra splits, the involution is adjoint to a Pfister form. Moreover, cohomological invariants of those algebras with involution are discussed
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