Invariant densities and escape rates: Rigorous and computable approximations in the L∞-norm

Abstract

In this article we study a piecewise linear discretization schemes for transfer operators (Perron-Frobenius operators) associated with interval maps. We show how these can be used to provide rigorous pointwise approximations for invariant densities of Markov interval maps. We also derive the order of convergence of the approximate invariant density to the real one in the L∞-norm. The outcome of this paper complements rigorous results on L1 approximations of invariant densities KMY and recent results on the formulae of escape rates of open dynamical systems KL2. We implement our computations on two examples (one rigorous and one non-rigorous) to illustrate the feasibility and efficiency of our schemes.