Invariant density & time asymptotics for collisionless kinetic equations with partly diffuse boundary operators

Abstract

This paper deals with collisionless transport equations in bounded open domains ⊂ d (d≥ 2) with C1 boundary ∂ , orthogonally invariant velocity measure m( v) with support V⊂ d and stochastic partly diffuse boundary operators H relating the outgoing and incoming fluxes. Under very general conditions, such equations are governed by stochastic C0-semigroups ( UH(t)) t≥ 0 on % L1( × V, x m( v)). We give a general criterion of irreducibility of % ( UH(t)) t≥ 0 and we show that, under very natural assumptions, if an invariant density exists then ( UH(t)) t≥ 0 converges strongly (not simply in Cesar\`o means) to its ergodic projection. We show also that if no invariant density exists then ( UH(t)) t≥ 0 is sweeping in the sense that, for any density , the total mass of UH(t) concentrates near suitable sets of zero measure as t→ +∞ . We show also a general weak compactness theorem of interest for the existence of invariant densities. This theorem is based on several results on smoothness and transversality of the dynamical flow associated to ( UH(t)) t≥ 0.