Scaling limit of heavy tailed nearly unstable cumulative INAR(∞) processes and rough fractional diffusions

Abstract

In this paper, we investigate the scaling limit of heavy-tailed nearly unstable cumulative INAR(∞) processes. These processes exhibit a power-law tail of the form n-(1+α) for α ∈ (12, 1), and the 1 norm of the kernel vector converges to 1. We demonstrate that the discrete-time scaling limit retains a long-memory property and can be viewed as an integrated fractional Cox-Ingersoll-Ross process. Moreover, we present an efficient method for simulating the fractional Cox-Ingersoll-Ross process. The simulation and Goodness-of-Fit Test code are available at https://github.com/gagawjbytw/INAR-rough-Heston.