Stochastic Coalescence Multi-Fragmentation Processes

Abstract

We study infinite systems of particles which undergo coalescence and fragmentation, in a manner determined solely by their masses. A pair of particles having masses x and y coalesces at a given rate K(x,y). A particle of mass x fragments into a collection of particles of masses θ\1 x, θ\2 x, … at rate F(x) β(dθ). We assume that the kernels K and F satisfy H\"older regularity conditions with indices λ ∈ (0,1] and α ∈ [0, ∞) respectively. We show existence of such infinite particle systems as strong Markov processes taking values in \λ, the set of ordered sequences (m\i)\i 1 such that Σ\i 1 m\iλ ∞. We show that these processes possess the Feller property. This work relies on the use of a Wasserstein-type distance, which has proved to be particularly well-adapted to coalescence phenomena.