Spatiotemporal Hawkes processes with a graphon-induced connectivity structure

Abstract

We introduce a spatiotemporal self-exciting point process (Nt(x)), boundedly finite both over time [0,∞) and space X, with excitation structure determined by a graphon W on X2. This graphon Hawkes process generalizes both the multivariate Hawkes process and the Hawkes process on a countable network, and despite being infinite-dimensional, it is surprisingly tractable. After proving existence, uniqueness and stability results, we show, both in the annealed and in the quenched case, that for compact, Euclidean X⊂ Rm, any graphon Hawkes process can be obtained as the suitable limit of d-dimensional Hawkes processes Nd, as d∞. Furthermore, in the stable regime, we establish an FLLN and an FCLT for our infinite-dimensional process on compact X⊂ Rm, while in the unstable regime we prove divergence of NT( X)/T, as T∞. Finally, we exploit a cluster representation to derive fixed-point equations for the Laplace functional of N, for which we set up a recursive approximation procedure. We apply these results to show that, starting with multivariate Hawkes processes Ndt converging to stable graphon Hawkes processes, the limits d∞ and t∞ commute.