• DocumentCode
    2337107
  • Title

    Dynamic response of nonlinear measurement systems

  • Author

    Xiong-Zhu, Pu ; Ming-Wu, Zhu

  • Author_Institution
    Mech. Inst., Nanjing Univ. of Sci. and Technol., China
  • fYear
    1994
  • fDate
    10-12 May 1994
  • Firstpage
    1147
  • Abstract
    A new algorithm is proposed to calculate the Laplace transform of the product of functions, so that the transformation can be used to solve the problem of nonlinear systems. The nonlinear transfer functions and approximate solutions of pulse response of first and second order systems calculated by this method are the same as by Volterra series method, but can be obtained more conveniently. The frequency responses of first and second order systems with cubical nonlinearities and their stability problem are studied. A judgement is proposed for second order nonlinear systems to prevent some special phenomena of nonlinear systems, such as jump, superharmonic resonance, bifurcation, etc
  • Keywords
    Laplace transforms; Volterra series; instrumentation amplifiers; measurement theory; nonlinear systems; stability; transducers; transfer functions; Laplace transform; Volterra series method; approximate solutions; bifurcation; cubical nonlinearities; dynamic response; first order systems; frequency responses; jump; nonlinear measurement systems; nonlinear transfer functions; pulse response; second order systems; stability; superharmonic resonance; Differential equations; Frequency; Harmonic analysis; Laplace equations; Nonlinear dynamical systems; Nonlinear equations; Nonlinear systems; Resonance; Stability; Transforms;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Instrumentation and Measurement Technology Conference, 1994. IMTC/94. Conference Proceedings. 10th Anniversary. Advanced Technologies in I & M., 1994 IEEE
  • Conference_Location
    Hamamatsu
  • Print_ISBN
    0-7803-1880-3
  • Type

    conf

  • DOI
    10.1109/IMTC.1994.351853
  • Filename
    351853