Conrad

Results: 2022



#Item
21CONSTRUCTING ALGEBRAIC CLOSURES KEITH CONRAD Let K be a field. We want to construct an algebraic closure of K, i.e., an algebraic extension of K which is algebraically closed. It will be built out of the quotient of a po

CONSTRUCTING ALGEBRAIC CLOSURES KEITH CONRAD Let K be a field. We want to construct an algebraic closure of K, i.e., an algebraic extension of K which is algebraically closed. It will be built out of the quotient of a po

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Source URL: www.math.uconn.edu

Language: English - Date: 2017-04-17 00:11:39
    22FINITE GROUP SCHEMES OVER BASES WITH LOW RAMIFICATION BRIAN CONRAD Abstract. Let A0 be a complete characteristic (0, p) discrete valuation ring with absolute ramification degree e and a perfect residue field. We are inte

    FINITE GROUP SCHEMES OVER BASES WITH LOW RAMIFICATION BRIAN CONRAD Abstract. Let A0 be a complete characteristic (0, p) discrete valuation ring with absolute ramification degree e and a perfect residue field. We are inte

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    Source URL: math.stanford.edu

    Language: English - Date: 2004-08-10 17:19:57
      23Document sans titre LES CORSES ET LES PLANTES SAUVAGES AUTREFOIS ET MAINTENANT Conférence faite à Cervioni le 3 avril 1981 Par Mme MARCELLE CONRAD

      Document sans titre LES CORSES ET LES PLANTES SAUVAGES AUTREFOIS ET MAINTENANT Conférence faite à Cervioni le 3 avril 1981 Par Mme MARCELLE CONRAD

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      Source URL: adecec.net

      Language: French - Date: 2012-06-29 07:23:38
        24SL2 (Z) KEITH CONRAD 1. Introduction The group SL2 (Z), which lies discretely in SL2 (R), has a role somewhat like that of Z inside of R. It is the most basic example of a discrete nonabelian group. Two particular

        SL2 (Z) KEITH CONRAD 1. Introduction The group SL2 (Z), which lies discretely in SL2 (R), has a role somewhat like that of Z inside of R. It is the most basic example of a discrete nonabelian group. Two particular

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        Source URL: www.math.uconn.edu

        Language: English - Date: 2017-08-14 16:02:25
          25Arbeitsgemeinschaften im 1. Halbjahr alphabetisch sortiert Antikes Theater  (ab Kl. 8) Kursleiter Herr Conrad

          Arbeitsgemeinschaften im 1. Halbjahr alphabetisch sortiert Antikes Theater  (ab Kl. 8) Kursleiter Herr Conrad

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          Source URL: www.wilhelm-gym.de

          Language: German - Date: 2018-08-13 18:01:59
            26

            Besprechung vomAnwesende: R. Böspflug, MVS A. Brand, MR B. Conrad, MKK

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            Source URL: desy2.desy.de

            Language: German - Date: 2013-05-28 09:20:15
              27GENERATING SETS KEITH CONRAD 1. Introduction In Rn , every vector can be written as a (unique) linear combination of the standard basis e1 , . . . , en . A notion weaker than a basis is a spanning set: a set of vectors i

              GENERATING SETS KEITH CONRAD 1. Introduction In Rn , every vector can be written as a (unique) linear combination of the standard basis e1 , . . . , en . A notion weaker than a basis is a spanning set: a set of vectors i

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              Source URL: www.math.uconn.edu

              Language: English - Date: 2016-12-17 13:51:20
                28CONRAD SCHNITZLER / PYROLATOR CON-STRUCT CD / Vinyl (incl. CD) / Download VÖ: 17. Juli 2015 Wer ist Conrad Schnitzler?

                CONRAD SCHNITZLER / PYROLATOR CON-STRUCT CD / Vinyl (incl. CD) / Download VÖ: 17. Juli 2015 Wer ist Conrad Schnitzler?

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                Source URL: www.bureau-b.com

                Language: German - Date: 2015-05-06 05:16:29
                  29SIMULTANEOUS COMMUTATIVITY OF OPERATORS KEITH CONRAD Throughout this note, we work with linear operators on complex vector spaces, of finite dimension. Any such operator has an eigenvector, by the fundamental theorem of

                  SIMULTANEOUS COMMUTATIVITY OF OPERATORS KEITH CONRAD Throughout this note, we work with linear operators on complex vector spaces, of finite dimension. Any such operator has an eigenvector, by the fundamental theorem of

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                  Source URL: www.math.uconn.edu

                  Language: English - Date: 2003-08-25 19:15:19
                    30RELATIVISTIC ADDITION AND GROUP THEORY KEITH CONRAD 1. Introduction For three particles P, Q, R travelling on a straight line, let vP Q be the (relative) velocity of P as measured by Q, and define vQR , vP R similarly.

                    RELATIVISTIC ADDITION AND GROUP THEORY KEITH CONRAD 1. Introduction For three particles P, Q, R travelling on a straight line, let vP Q be the (relative) velocity of P as measured by Q, and define vQR , vP R similarly.

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                    Source URL: www.math.uconn.edu

                    Language: English - Date: 2016-12-17 14:19:44