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Dynamical Analysis for a General Jerky Equation with Random Excitation
  
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KeyWord:Jerky equation, stochastic stability, stochastic bifurcation, stationary solution
Author NameAffiliation
Diandian Tang Henan Academy of Big Data, Zhengzhou University, Zhengzhou, Henan 450001, China 
Jingli Ren Henan Academy of Big Data, Zhengzhou University, Zhengzhou, Henan 450001, China 
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Abstract:
      A general jerky equation with random excitation is investigated in this paper. Before introducing the random excitation term, the equation is reduced to a two-dimensional model when undergoing a Hopf bifurcation. Then the model with the parametric excitation and external excitation is converted to a stochastic differential equation with singularity based on the stochastic average theory. For the equation, its dynamical behaviors are analyzed in different parameters' spaces, including the stability, stochastic bifurcation and stationary solution. Besides, numerical simulations are given to show the asymptotic behavior of the stationary solution.