Mean-field limits for non-linear Hawkes processes with inhibition on a Erdos-R\'enyi-graph

Abstract

We study a multivariate, non-linear Hawkes process ZN on a q-Erdos-R\'enyi-graph with N nodes. Each vertex is either excitatory (probability p) or inhibitory (probability 1-p). If p≠12, we take the mean-field limit of ZN, leading to a multivariate point process Z. We rescale the interaction intensity by N and find that the limit intensity process solves a deterministic convolution equation and all components of Z are independent. The fluctuations around the mean field limit converge to the solution of a stochastic convolution equation. In the critical case, p=12, we rescale by N1/2 and discuss difficulties, both heuristically and numerically.

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