110,850 research outputs found

    Idiotikon von Hessen : durch Vilmar und Pfister / Erg.-H. 1

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    Elektronische Reproduktion von: Idiotikon von Hessen : durch Vilmar und Pfister / durch Hermann von Pfister ; Erg.-H. 1. - Marburg : Elwert, 1889. - 31 Seiten. - Standort: Universität Marburg, Universitätsbibliothek. - Signatur: 085 8 2019/01308. - Bemerkungen: In Fraktur. - Viele handschriftl. Anm.; Arbeitsexemplar. - (Hassiaca) Digitalisiert 202

    Akademische Feier zum 80. Geburtstag von Herrn Universitätsprofessor Dr. Dr. H. c. mult. Max Pfister : 27. April 2012

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    Akademische Feier zum 80. Geburtstag von Herrn Universitätsprofessor Dr. Dr. H. c. mult. Max Pfister : 27. April 201

    Akademische Feier zum 80. Geburtstag von Herrn Universitätsprofessor Dr. Dr. H. c. mult. Max Pfister : 27. April 2012

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    Akademische Feier zum 80. Geburtstag von Herrn Universitätsprofessor Dr. Dr. H. c. mult. Max Pfister : 27. April 201

    Function Fields of Pfister Neighbors

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    AbstractA quadratic form Q is called a special Pfister neighbor if Q is similar to a form of the shape P0 ⊥ aP1, where P0 is Pfister, a ∈ k*, and P1 is a nonzero subform of P0. The Pfister form P0 ⊥ aP0, which is uniquely determined by Q, is called the associated Pfister form of Q. If P is an anisotropic Pfister form of dimension > 8, then every subform Q of P of codimension ≤ 4 is a special Pfister neighbor; and there exists an example with dim P = 16 and codim Q = 5 which is not special. Special Pfister neighbors of the same dimension and with the same associated Pfister form define the same function field, but there exists an example in dimension 5 which shows that such forms need not be similar

    On a generalization of Pfister forms

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    Ef K er kroppur með kennitölu 2, þá hafa Pfister formin yfir K ákveðna tengingu við grúpurnar H^{n+1}_2(K). Við munum innleiða náttúrlega útvíkkun á þessum Pfister formum í form af gráðu p yfir kroppa með kennitölu p, og sjá hvort þessar útvíkkanir hafa svipaða tengingu við grúpurnar H^{n+1}_p(K). Svo reynist ekki vera og við setjum fram mótdæmi í lok ritgerðarinnar. Enn er þó ósvarað hvort okkar túlkun á svipaðri tengingu er röng eða hvort okkar útvíkkun á Pfister formum er ekki sú rétta til að finna slíka tengingu. Síðan er eftir sá möguleiki að engin slík útvíkkun sé til. Þar sem H^2_p(K) tengjast miðlægu einföldu algebrunum [a,b)_K munum við einnig framkvæma nokkra útreikninga á smækkaða normi [a,b)_K.If K is a field of characteristic 2, then the Pfister forms over K have a certain connection with the groups H^{n+1}_2(K). We will introduce a natural generalization of these Pfister forms to forms of degree p over fields of characteristic p, and see whether these generalizations have a similar connection with the groups H^{n+1}_p(K). It turns out that this is not the case and we provide a counterexample at the end. There remains the question whether our interpretation of similar connection is wrong or whether our generalization of Pfister forms is not the right one to find such a connection. Then there remains the possibility that there is no such generalization. Also, since H^2_p(K) relates to the central simple algebras [a,b)_K, we will do some calculations of the reduced norm of [a,b)_K

    Types of linkage of quadratic Pfister forms

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    Abstract: Given a field F of positive characteristic p, theta is an element of H-p(n-1)(F) and beta,gamma is an element of Fx, we prove that if the symbols theta d beta/beta and theta d gamma/gamma in H-p(n)(F) share the same factors in H-p(1) (F) then the symbol theta d beta/beta d gamma/gamma in H-p(n+1)(F) is trivial. We conclude that when p = 2, every two totally separably (n - 1)-linked n-fold quadratic Pfister forms are inseparably (n - 1)-linked. We also describe how to construct non-isomorphic n-fold Pfister forms which are totally separably (or inseparably) (n - 1)-linked, i.e. share all common (n 1)-fold quadratic (or bilinear) Pfister factors. (C) 2018 Elsevier Inc. All rights reserved

    Une histoire du protestantisme en Alsace. D. Johann Adam. Evangelische Kirchengeschichte der elsässischen Territorien bis zur französischen Revolution, Strassburg, J. H. Ed. Heitz

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    Pfister Christian. Une histoire du protestantisme en Alsace. D. Johann Adam. Evangelische Kirchengeschichte der elsässischen Territorien bis zur französischen Revolution, Strassburg, J. H. Ed. Heitz. In: Revue d'histoire et de philosophie religieuses, 8e année n°1, Janvier-février 1928. pp. 84-86

    Une histoire du protestantisme en Alsace. D. Johann Adam. Evangelische Kirchengeschichte der elsässischen Territorien bis zur französischen Revolution, Strassburg, J. H. Ed. Heitz

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    Pfister Christian. Une histoire du protestantisme en Alsace. D. Johann Adam. Evangelische Kirchengeschichte der elsässischen Territorien bis zur französischen Revolution, Strassburg, J. H. Ed. Heitz. In: Revue d'histoire et de philosophie religieuses, 8e année n°1, Janvier-février 1928. pp. 84-86

    Umgebungskarte von Tambach-Dietharz / herausgegeben von Karl Pfister Buch- und Schreibwaren-Handlung

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    Die Digitalisierung wurde durch die Deutsche Digitale Bibliothek im Rahmen des von der Beauftragten der Bundesregierung für Kultur und Medien (BKM) geförderten Programms NEUSTART KULTUR ermöglicht.Titelkartusche oben rechtsOhne Kartennetz und RandgraduierungKart
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