• DocumentCode
    3381876
  • Title

    Sensitivity invariant sums of high-order

  • Author

    Izydorczyk, Jacek ; Chojcan, Jan

  • Author_Institution
    Silesian Univ. of Technol., Gliwice
  • fYear
    2008
  • fDate
    Aug. 31 2008-Sept. 3 2008
  • Firstpage
    234
  • Lastpage
    237
  • Abstract
    In this paper, a new class of invariant sensitivity sums of higher-order sensitivities for nonlinear circuits is introduced. Sensitivity sums considered are relevant to branch currents and branch voltages of a general class of nonlinear dynamic circuits containing passive and active elements and arbitrary number of excitations. It is assumed that the circuit consists of one-port elements and two-port elements only. The invariant sensitivity sums introduced herein are based on invariant sensitivity sums of first order derived by the means of Tellegen theorem. Mathematical induction lets us prove validity of the sums for sensitivities of arbitrary high order. Derivations are illustrated by an example of direct-current nonlinear bridge for which second order sensitivities of all branch currents and voltages are numerically computed and validity of proved invariant sensitivity sums is checked.
  • Keywords
    bridge circuits; nonlinear dynamical systems; nonlinear network analysis; sensitivity analysis; two-port networks; Tellegen theorem; active elements; branch currents; branch voltages; direct-current nonlinear bridge; high-order sensitivities; nonlinear dynamic circuits; one-port elements; passive elements; sensitivity invariant sums; two-port elements; Bridge circuits; Capacitance; Collaboration; Nonlinear circuits; Sensitivity analysis; Transfer functions; Voltage control;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Electronics, Circuits and Systems, 2008. ICECS 2008. 15th IEEE International Conference on
  • Conference_Location
    St. Julien´s
  • Print_ISBN
    978-1-4244-2181-7
  • Electronic_ISBN
    978-1-4244-2182-4
  • Type

    conf

  • DOI
    10.1109/ICECS.2008.4674834
  • Filename
    4674834