Stochastic nonlinear beam equations driven by compensated Poisson random measures
arXiv:1011.5377
Abstract
We consider a type of stochastic nonlinear beam equation driven by Lévy noise. By using a suitable Lyapunov function and applying the Khasminskii test we show the nonexplosion of the mild solutions. In addition, under some additional assumptions we prove the exponential stability of the solutions.
56 pages