5-polinomial stationary Schrödinger boundary problem for domain wall for data storage based on interface of polar-active ferroelectric nanofilm with semiconductor

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The quantized polarization as well as energy levels solutions of stationary Schrödinger boundary problem for domain wall for data storage based on interface of polar-active ferroelectric nanofilm with semiconductor are found. The self-consistent stationarity quantized solutions of the both like cubic thus 5-polinomial Schrödinger or Euler-Lagrange boundary problem for the polarization vector with one-dimensional Maxwell equations system at interface of thin ferroelectric films and semiconductor in framework of Landau-Ginsburg-Devonshire (LGD) theory theory were presented. We have found the quantized solutions of stationarity non-linear high-polinomial Schrödinger or Euler-Lagrange boundary problem for the polarization vector with one-dimensional Maxwell equations system at interface of thin ferroelectric films and semiconductor. Quantized solutions of one-dimensional Maxwell equations for thin ferroelectric films have been specified which were bonded with stationary solution of cubic and 5-polinomial Schrödinger equation are found.

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