• DocumentCode
    1691454
  • Title

    Optimal Cramer-Rao estimators for dimensions greater than two

  • Author

    Frasca, Marco

  • Author_Institution
    Seeker Div., MBDA Italia S.p.A., Rome, Italy
  • fYear
    2011
  • Firstpage
    657
  • Lastpage
    660
  • Abstract
    We prove a theorem for a three-dimensional Fisher-Rao information matrix that a set of optimal estimators can be found, in the Cramer-Rao sense, provided we are able to reduce the matrix to the identity almost everywhere. This amounts to solve Einstein equations in three dimensions. This theorem generalizes a preceding one obtained for two dimensions.
  • Keywords
    geometry; information theory; Cramer-Rao sense; Einstein equations; dimensional Fisher-Rao information matrix; optimal Cramer-Rao estimators; Cramer-Rao bounds; Equations; Information geometry; Measurement; Radar; Tensile stress;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Radar Symposium (IRS), 2011 Proceedings International
  • Conference_Location
    Leipzig
  • Print_ISBN
    978-1-4577-0138-2
  • Type

    conf

  • Filename
    6042201