Asymptotics of ODE's flows everywhere or almost-everywhere in the torus:from rotation sets to homogenization of transport equations
Abstract
In this paper, we study various aspects of the ODE's flow X solution to the equation ∂t X(t,x)=b(X(t,x)), X(0,x)=x in the d-dimensional torus Yd, where b is a regular Zd-periodic vector field from Rd in Rd.We present an original and complete picture in any dimension of all logical connections between the following seven conditions involving the field b: (i) the everywhere asymptotics of the flow X, (ii) the almost-everywhere asymptotics of the flow X, (iii) the global rectification of the vector field b in Yd, (iv) the ergodicity of the flow related to an invariant probability measure which is absolutely continuous with respect to Lebesgue's measure, (v) the unit set condition for Herman's rotation set Cb composed of the means of b related to the invariant probability measures, (vi) the unit set condition for the subset Db of Cb composed of the means of b related to the invariant probability measures which are absolutely continuous with respect to Lebesgue's measure, (vii) the homogenization of the linear transport equation with oscillating data and the oscillating velocity b(x/) when b is divergence free. The main and surprising result of the paper is that the almost-everywhere asymptotics of the flow X and the unit set condition for Db are equivalent when Db is assumed to be non empty, and that the two conditions turn to be equivalent to the homogenization of the transport equation when b is divergence free. In contrast, using an elementary approach based on classical tools of PDE's analysis, we extend the two-dimensional results of Oxtoby and Marchetto to any d-dimensional Stepanoff flow: this shows that the ergodicity of the flow may hold without satisfying the everywhere asymptotics of the flow.
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