Convergence to a Lévy process in the Skorohod M1 and M2 topologies for nonuniformly hyperbolic systems, including billiards with cusps

Commun. Math. Phys. 375 (2020) 653-678.

Ian Melbourne and Paulo Varandas


Abstract

We prove convergence to a Lévy process for a class of dispersing billiards with cusps. For such examples, convergence to a stable law was proved by Jung & Zhang. For the corresponding functional limit law, convergence is not possible in the usual Skorohod J1 topology. Our main results yield elementary geometric conditions for convergence (i) in M1, (ii) in M2 but not M1. As far as we know, this is the first instance where the M2 topology arises naturally.

In general, we show for a large class of nonuniformly hyperbolic systems how to deduce functional limit laws once convergence to the corresponding stable law is known.


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