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1 results

  • A characterization of inner product spaces via norming vectors

  • Part of
  • Guillaume Aubrun, Mathis Cavichioli
  • Journal:
    Canadian Mathematical Bulletin , First View
    Published online by Cambridge University Press:
    03 January 2025, pp. 1-5
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  • A finite-dimensional normed space is an inner product space if and only if the set of norming vectors of any endomorphism is a linear subspace. This theorem was proved by Sain and Paul for real scalars. In this paper, we give a different proof which also extends to the case of complex scalars.