Frequently hypercyclic meromorphic curves with slow growth (2409.08048v4)

Abstract: We construct entire curves in projective spaces that are simultaneously frequently hypercyclic for translations along countably many specified directions, while preserving optimal slow growth rates. Moreover, we demonstrate that there do not exist entire curves that are frequently hypercyclic for translations along uncountably many directions while still exhibiting optimal slow growth. This result contrasts with the phenomenon observed for hypercyclic entire functions, which can be hypercyclic for translations along uncountably many directions while maintaining slow growth. Our approach is fundamentally grounded in Nevanlinna theory, and the construction is heuristically guided by the Oka principle. This work provides a new perspective on the intricate interplay between the dynamical properties and growth rates of entire curves in projective spaces.