On a family of Self-Affine IFS whose attractors have a non-fractal top

Kevin G. Hare; Nikita Sidorov

arXiv:2101.01798·math.DS·October 4, 2021

On a family of Self-Affine IFS whose attractors have a non-fractal top

Kevin G. Hare, Nikita Sidorov

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Abstract

Let $0 < λ < μ < 1$ and $λ + μ > 1$ . In this note we prove that for the vast majority of such parameters the top of the attractor $A_{λ, μ}$ of the IFS ${(λ x, μ y), (μx + 1 - μ, λ y + 1 - λ)}$ is the graph of a continuous, strictly increasing function. Despite this, for most parameters, $A_{λ, μ}$ has a box dimension strictly greater than 1, showing that the upper boundary is not representative of the complexity of the fractal. Finally, we prove that if $λ μ \geq 2^{- 1/6}$ , then $A_{λ, μ}$ has a non-empty interior.

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