Topological expansive Lorenz maps with a hole at critical point

Abstract

Let f be an expansive Lorenz map and c be the critical point. The survivor set is denoted as Sf(H):=\x∈[0,1]: fn(x) H, ∀ n≥ 0\, where H is a open subinterval. Here we study the hole H=(a,b) with a≤ c ≤ b and a≠ b . We show that the case a=c is equivalent to the hole at 0, the case b=c equals to the hole at 1. We also obtain that, given an expansive Lorenz map f with a hole H=(a,b) and Sf(H)\0,1\, then there exists a Lorenz map g such that Sf(H)(g) is countable, where (g) is the Lorenz-shift of g and Sf(H) is the symbolic representation of Sf(H). Let a be fixed and b varies in (c,1), we also give a complete characterization of the maximal interval I(b) such that for all ε∈ I(b), Sf(a,ε)=Sf(a,b), and I(b) may degenerate to a single point b. Moreover, when f has an ergodic acim, we show that the topological entropy function λf(a):b htop(f|Sf(a,b)) is a devil staircase with a being fixed, so is λf(b) if we fix b. At the special case f being intermediate β-transformation, using the Ledrappier-Young formula, we obtain that the Hausdorff dimension function ηf(a):b H(Sf(a,b)) is a devil staircase when fixing a, so is ηf(b) if b is fixed. As a result, we extend the devil staircases in Urbanski1986,kalle2020,Langeveld2023 to expansive Lorenz maps with a hole at critical point.

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