Transport semigroup associated to positive boundary conditions of unit norm: a Dyson-Phillips approach

Abstract

We revisit our study of general transport operator with general force field and general invariant measure by considering, in the L1 setting, the linear transport operator H associated to a linear and positive boundary operator H of unit norm. It is known that in this case an extension of H generates a substochastic (i.e. positive contraction) C0-semigroup (VH(t))t≥ 0. We show here that (VH(t))t≥ 0 is the smallest substochastic C0-semigroup with the above mentioned property and provides a representation of (VH(t))t ≥ 0 as the sum of an expansion series similar to Dyson-Phillips series. We develop an honesty theory for such boundary perturbations that allows to consider the honesty of trajectories on subintervals J ⊂eq [0,∞). New necessary and sufficient conditions for a trajectory to be honest are given in terms of the aforementioned series expansion.