Convergence rate to equilibrium for conservative scattering models on the torus: a new tauberian approach
Abstract
The object of this paper is to provide a new and systematic tauberian approach to quantitative long time behaviour of C0-semigroups (V(t))t ≥0 in L1(Td× Rd) governing conservative linear kinetic equations on the torus with general scattering kernel k(v,v') and degenerate (i.e. not bounded away from zero) collision frequency σ(v)=∫Rd k(v',v)m(d v'), (with m(d v) being absolutely continuous with respect to the Lebesgue measure). We show in particular that if N0 is the maximal integer s ≥0 such that 1σ(·)∫Rdk(·,v)σ-s(v)m(d v) ∈ L∞(Rd) then, for initial datum f such that d s∫Td× Rd|f(x,v)|σ-N0(v)d x m(d v) <∞ it holds \|V(t)f-f\|L1=εf(t)(1+t)N0-1, f:= ∫Rdf(x,v)m(d v) where is the unique invariant density of (V(t))t ≥0 and t∞εf(t)=0. We in particular provide a new criteria of the existence of invariant density. The proof relies on the explicit computation of the time decay of each term of the Dyson-Phillips expansion of V(t) and on suitable smoothness and integrability properties of the trace on the imaginary axis of Laplace transform of remainders of large order of this Dyson-Phillips expansion. Our construction resorts also on collective compactness arguments and provides various technical results of independent interest. Finally, as a by-product of our analysis, we derive essentially sharp ``subgeometric'' convergence rate for Markov semigroups associated to general transition kernels.
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