• Title of article

    Quantum information entropies and orthogonal polynomials

  • Author/Authors

    Dehesa، نويسنده , , Jes?s S. and Mart??nez-Finkelshtdein، نويسنده , , Andrei and S?nchez-Ruiz، نويسنده , , Jorge، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2001
  • Pages
    24
  • From page
    23
  • To page
    46
  • Abstract
    This is a survey of the present knowledge on the analytical determination of the Shannon information entropies for simple quantum systems: single-particle systems in central potentials. Emphasis is made on D-dimensional harmonic oscillator and Coulombian potentials in both position and momentum spaces. First of all, these quantities are explicitly shown to be controlled by the entropic integrals of some classical orthogonal polynomials (Hermite, Laguerre and Gegenbauer). Then, the connection of these integrals with more common mathematical objects, such as the logarithmic potential, energy and Lp-norms of orthogonal polynomials, is briefly described. Third, its asymptotic behaviour is discussed for both general and varying weights. The explicit computation of these integrals is carried out for the Chebyshev and Gegenbauer polynomials, which have a bounded orthogonality interval, as well as for Hermite polynomials to illustrate the difficulties encountered when the interval is unbounded. These results have allowed us to find the position and momentum entropies of the ground and excited states of the physical systems mentioned above.
  • Keywords
    D-dimensional physics , orthogonal polynomials , Quantum information entropies , Harmonic oscillator , Coulomb potential , Probability measures
  • Journal title
    Journal of Computational and Applied Mathematics
  • Serial Year
    2001
  • Journal title
    Journal of Computational and Applied Mathematics
  • Record number

    1551447