When will a One Parameter Family of Unimodal Maps Produce Finite Limit Cycles Monotonically with the Parameter?

Abstract

In this note we consider a collection C of one parameter families of unimodal maps of [0,1]. Each family in the collection has the form \μ f\ where μ∈ [0,1]. Denoting the kneading sequence of μ f by K(μ f), we will prove that for each member of C, the map μ K(μ f) is monotone. It then follows that for each member of C the map μ h(μ f) is monotone, where h(f) is the topological entropy of μ f. For interest, μ f(x)=4μ x(1-x) and μ f(x)=μ(π x) are shown to belong to C. This extends the work of Masato Tsujii [1].