Stochastic stability of invariant measures: The 2D Euler equation

Abstract: In finite-dimensional dissipative dynamical systems, stochastic stability provides the selection of the physical relevant measures. That this might also apply to systems defined by partial differential equations, both dissipative and conservative, is the inspiration for this work. As an example the 2D Euler equation is studied. Among other results this study suggests that the coherent structures observed in 2D hydrodynamics are associated to configurations that maximize stochastically stable measures uniquely … Show more