Non-existence of Lyapunov exponents in the Newhouse domain

Abstract

We show that within the Newhouse domain of Cr surface diffeomorphisms (r ∈ [2,∞ )), there exists a dense subset D such that for any f ∈ D, Lyapunov exponents fail to exist for all points in some open set U and all nonzero tangent vectors in some open cone V ⊂ R2. This demonstrates that the non-existence of Lyapunov exponents is a persistent phenomenon in the setting of robust homoclinic tangencies. The proof relies on constructing diffeomorphisms exhibiting specific oscillatory return times near a homoclinic tangency, incorporating techniques from Newhouse theory and recent results on Lyapunov irregularity, alongside several refinements and new arguments.