Degenerate stochastic differential equations arising from catalytic branching networks

Abstract

We establish existence and uniqueness for the martingale problem associated with a system of degenerate SDE's representing a catalytic branching network. For example, in the hypercyclic case: dXt(i)=bi(Xt)dt+2γi(Xt) Xt(i+1)Xt(i)dBti, Xt(i) 0, i=1,..., d, where X(d+1) X(1), existence and uniqueness is proved when γ and b are continuous on the positive orthant, γ is strictly positive, and bi>0 on \xi=0\. The special case d=2, bi=θi-xi is required in work of Dawson-Greven-den Hollander-Sun-Swart on mean fields limits of block averages for 2-type branching models on a hierarchical group. The proofs make use of some new methods, including Cotlar's lemma to establish asymptotic orthogonality of the derivatives of an associated semigroup at different times,and a refined integration by parts technique from Dawson-Perkins]. As a by-product of the proof we obtain the strong Feller property of the associated resolvent.