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Coordinate-free operators based on one vector. I. Formal considerations

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Abstract

In many systems, the tensors used to describe physical properties must acquire their structure from one vector. Knowledge of that fact alone leads to an interesting line of analysis for such systems. The analysis begins with a discussion of the types of dyadics that can be constructed from one vector. Attention is focused on certain exemplary dyadic operators, which, because of their geometrical properties, would appear particularly basic; the algebra of these dyadics is developed in detail. The algebra is then used in a derivation of the expansion of general functions of these dyadics. Several applications of the general expansion are presented: the inverse of a general dyadic operator (when it exists), a general rotation operator that includes strains and reflections, the determinant of a general dyadic operator, and operators, including some new ones, used in constructing Lorentz boosts. Finally, a coordinate-free representation of the Levi-Civita tensor is provided.

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Author notes

  1. Ramarao Inguva

    Present address: Optical Systems Division, EB23, National Aeronautics and Space Administration, Marshall Space Flight Center, 35812, Alabama

Authors and Affiliations

  1. Research, Development, and Engineering Center, AMSMI-RD-AS-RA, U.S. Army Missile Command, 35898-5253, Redstone Arsenal, Alabama

    C. Ray Smith

  2. Strategic Systems Division, Teledyne Brown Engineering, Huntsville, Alabama

    Steven R. Rolf

  3. Department of Physics and Astronomy, University of Wyoming, Laramie, Wyoming

    Ramarao Inguva

  4. the Department of Physics and Astronomy, University of Wyoming, Laramie, Wyoming

    Steven R. Rolf

Authors
  1. C. Ray Smith
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  2. Steven R. Rolf
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  3. Ramarao Inguva
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Smith, C.R., Rolf, S.R. & Inguva, R. Coordinate-free operators based on one vector. I. Formal considerations. Found Phys 20, 1111–1122 (1990). https://doi.org/10.1007/BF00731856

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  • DOI: https://doi.org/10.1007/BF00731856

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