Tips of Tongues in the Double Standard Family

Abstract

We answer a question raised by Misiurewicz and Rodrigues concerning the family of degree 2 circle maps Fλ:R/Z R/Z defined by \[Fλ(x) := 2x + a+ bπ (2π x) λ:=(a,b)∈ R/Z× (0,1).\] We prove that if Fλ n- id has a zero of multiplicity 3 in R/Z, then there is a system of local coordinates (α,β):W R2 defined in a neighborhood W of λ, such that α(λ) =β(λ)=0 and Fμ n - id has a multiple zero with μ∈ W if and only if β3(μ) = α2(μ). This shows that the tips of tongues are regular cusps.