Stochastic Stability of ACIMs for Piecewise Expanding C1+ Maps

Abstract

We prove stochastic stability of absolutely continuous invariant measures (ACIMs) for piecewise expanding C1+ maps of the interval. For maps τ in the class T([0,1]; s, ), we consider perturbed Frobenius--Perron operators Pδ = Qδ Pτ, where Qδ is a Markov smoothing operator modeling noise of intensity δ > 0. In the generalized bounded variation space BV1,1/p, we establish a Lasota--Yorke inequality uniform in δ. Consequently, each Pδ admits an invariant density hδ ∈ BV1,1/p, and hδ h in L1 as δ 0, where h is the ACIM density of Pτ. Our proof combines the BV1,1/p framework, adapted from recent ACIM existence results, with uniform quasi-compactness and perturbation theory for transfer operators. This establishes stochastic stability under minimal C1+ regularity ( > 0), where the C1 case is known to fail.