Noise-induced strong stabilization

We consider a 2-dimensional stochastic differential equation in polar coordinates depending on several parameters. We show that if these parameters belong to a specific regime then the deterministic system explodes in finite time, but the random dynamical system corresponding to the stochastic equation is not only strongly complete but even admits a random attractor.

[1]  L. Breuer Introduction to Stochastic Processes , 2022, Statistical Methods for Climate Scientists.

[2]  Tiffany N. Kolba,et al.  Noise-Induced Stabilization of Perturbed Hamiltonian Systems , 2019, Am. Math. Mon..

[3]  H. Crauel,et al.  Minimal random attractors , 2017, Journal of Differential Equations.

[4]  P. Kloeden,et al.  Nonautonomous and Random Attractors , 2015 .

[5]  F. Flandoli,et al.  Synchronization by noise for order-preserving random dynamical systems , 2015, 1503.08737.

[6]  Blow-up of a Stable Stochastic Differential Equation , 2014, 1408.0933.

[7]  Jonathan C. Mattingly,et al.  Noise-Induced Stabilization of Planar Flows II , 2014, 1404.0955.

[8]  Jonathan C. Mattingly,et al.  Noise-Induced Stabilization of Planar Flows I , 2014, 1404.0957.

[9]  David P. Herzog,et al.  The transition from ergodic to explosive behavior in a family of stochastic differential equations , 2011, 1105.2378.

[10]  C. Doering,et al.  Noise-Induced statistically stable oscillations in a deterministically divergent nonlinear dynamical system , 2012 .

[11]  Jonathan C. Mattingly,et al.  Propagating Lyapunov functions to prove noise-induced stabilization , 2011, 1111.1755.

[12]  Attractors and Expansion for Brownian Flows , 2009, 0909.3768.

[13]  H. Crauel,et al.  Criteria for Strong and Weak Random Attractors , 2008, 0809.2719.

[14]  Xiongzhi Chen Brownian Motion and Stochastic Calculus , 2008 .

[15]  M. Scheutzow Attractors for Ergodic and Monotone Random Dynamical Systems , 2007 .

[16]  Igor Chueshov,et al.  On the structure of attractors and invariant measures for a class of monotone random systems , 2004 .

[17]  G. Ochs Weak Random Attractors , 1999 .

[18]  M. Scheutzow,et al.  Perfect cocycles through stochastic differential equations , 1995 .

[19]  H. Crauel,et al.  Attractors for random dynamical systems , 1994 .

[20]  Michael Scheutzow,et al.  Stabilization and Destabilization by Noise in the Plane , 1993 .

[21]  H. M. Taylor A Stopped Brownian Motion Formula , 1975 .