From Hyper Roughness to Jumps as H -1/2
Abstract
We investigate the weak limit of the hyper-rough square-root process as the Hurst index H goes to -1/2\,. This limit corresponds to the fractional kernel tH - 1 / 2 losing integrability. We establish the joint convergence of the couple (X, M)\,, where X is the hyper-rough process and M the associated martingale, to a fully correlated Inverse Gaussian L\'evy jump process. This unveils the existence of a continuum between hyper-rough continuous models and jump processes, as a function of the Hurst index. Since we prove a convergence of continuous to discontinuous processes, the usual Skorokhod J1 topology is not suitable for our problem. Instead, we obtain the weak convergence in the Skorokhod M1 topology for X and in the non-Skorokhod S topology for M.
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