Field theory

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51Classical Field Theory Prof. Suresh Govindarajan Department of Physics Indian Institute of Technology, Madras Lecture - 1 What is Classical Field Theory

Classical Field Theory Prof. Suresh Govindarajan Department of Physics Indian Institute of Technology, Madras Lecture - 1 What is Classical Field Theory

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Source URL: textofvideo.nptel.iitm.ac.in

- Date: 2014-08-28 00:42:30
    52Introduction What is constructive geometry? IEGC (Intuitionistic Euclidean Constructive Geometry) Connections to Field Theory Field theory and the parallel postulate Independence results

    Introduction What is constructive geometry? IEGC (Intuitionistic Euclidean Constructive Geometry) Connections to Field Theory Field theory and the parallel postulate Independence results

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    Source URL: www.michaelbeeson.com

    - Date: 2016-06-01 17:41:52
      53Chapter 11 EM Lorentz force derived from Klein Gordon’s equation − from my book: Understanding Relativistic Quantum Field Theory

      Chapter 11 EM Lorentz force derived from Klein Gordon’s equation − from my book: Understanding Relativistic Quantum Field Theory

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      Source URL: www.physics-quest.org

      - Date: 2010-02-02 09:56:00
        54Contemporary Mathematics Valuation theory of exponential Hardy fields II: Principal parts of germs in the Hardy field of o-minimal exponential expansions of the reals Dedicated to the memory of Murray Marshall

        Contemporary Mathematics Valuation theory of exponential Hardy fields II: Principal parts of germs in the Hardy field of o-minimal exponential expansions of the reals Dedicated to the memory of Murray Marshall

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        Source URL: math.usask.ca

        - Date: 2016-09-19 10:23:36
          55THE ALGEBRA AND MODEL THEORY OF TAME VALUED FIELDS FRANZ–VIKTOR KUHLMANN Abstract. A henselian valued field K is called a tame field if its algebraic closure ˜ is a tame extension, that is, the ramification field of t

          THE ALGEBRA AND MODEL THEORY OF TAME VALUED FIELDS FRANZ–VIKTOR KUHLMANN Abstract. A henselian valued field K is called a tame field if its algebraic closure ˜ is a tame extension, that is, the ramification field of t

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          Source URL: math.usask.ca

          - Date: 2014-03-14 23:30:15
            56Chapter 1. Introduction Welcome to a beautiful subject!—the constructive approximation of functions. And welcome to a rather unusual book. Approximation theory is an established field, and my aim is to teach you some

            Chapter 1. Introduction Welcome to a beautiful subject!—the constructive approximation of functions. And welcome to a rather unusual book. Approximation theory is an established field, and my aim is to teach you some

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            Source URL: www.siam.org

            - Date: 2012-12-03 12:42:28
              57THE MODEL THEORY OF SEPARABLY TAME VALUED FIELDS FRANZ–VIKTOR KUHLMANN AND KOUSHIK PAL Abstract. A henselian valued field K is called separably tame if its separable-algebraic closure K sep is a tame extension, that is

              THE MODEL THEORY OF SEPARABLY TAME VALUED FIELDS FRANZ–VIKTOR KUHLMANN AND KOUSHIK PAL Abstract. A henselian valued field K is called separably tame if its separable-algebraic closure K sep is a tame extension, that is

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              Source URL: math.usask.ca

              - Date: 2014-09-10 08:45:20
                58Corrections to “Covering data and higher dimensional global class field theory” by Moritz Kerz and Alexander Schmidt 1: In the statement of Lemma 3.1 (ii), the assumption ‘normal’ should be replaced by ‘regular

                Corrections to “Covering data and higher dimensional global class field theory” by Moritz Kerz and Alexander Schmidt 1: In the statement of Lemma 3.1 (ii), the assumption ‘normal’ should be replaced by ‘regular

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                Source URL: www.mathematik.uni-regensburg.de

                  59Computing field degrees of radical extensions Willem Jan Palenstijn Universiteit Leiden Intercity number theory seminar

                  Computing field degrees of radical extensions Willem Jan Palenstijn Universiteit Leiden Intercity number theory seminar

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                  Source URL: www.math.leidenuniv.nl

                  - Date: 2006-03-02 14:37:02
                    60ON CANONICAL SUBGROUPS OF HILBERT-BLUMENTHAL ABELIAN VARIETIES SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field which is unramified over p. In this paper, we develop a theory of cano

                    ON CANONICAL SUBGROUPS OF HILBERT-BLUMENTHAL ABELIAN VARIETIES SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field which is unramified over p. In this paper, we develop a theory of cano

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                    Source URL: www2.math.kyushu-u.ac.jp

                    - Date: 2016-06-23 04:10:47