A Furstengerg - Kifer decomposition for implicit difference equations and its applications
A Furstengerg - Kifer decomposition for implicit difference equations and its applications
Du, Nguen Nuu
2003-06-01 00:00:00
In this article, we study a filtration of Furstenberg-Kifer type for Lyapunov exponents of a degenerate random dynamical system described by an implicit linear equation. An application of this result is to give a proof of the existence of bounded solutions.
http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.pngRandom Operators and Stochastic Equationsde Gruyterhttp://www.deepdyve.com/lp/de-gruyter/a-furstengerg-kifer-decomposition-for-implicit-difference-equations-7hvBReSPaE
A Furstengerg - Kifer decomposition for implicit difference equations and its applications
In this article, we study a filtration of Furstenberg-Kifer type for Lyapunov exponents of a degenerate random dynamical system described by an implicit linear equation. An application of this result is to give a proof of the existence of bounded solutions.
Journal
Random Operators and Stochastic Equations
– de Gruyter
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