The Schr\"oder functional equation and its relation to the invariant measures of chaotic maps

Abstract

The aim of this paper is to show that the invariant measure for a class of one dimensional chaotic maps, T(x), is an extended solution of the Schr\"oder functional equation, q(T(x))=λ q(x), induced by them. Hence, we give an unified treatment of a collection of exactly solved examples worked out in the current literature. In particular, we show that these examples belongs to a class of functions introduced by Mira, (see text). Moreover, as a new example, we compute the invariant densities for a class of rational maps having the Weierstrass functions as an invariant one. Also, we study the relation between that equation and the well known Frobenius-Perron and Koopman's operators.