2023
DOI: 10.54330/afm.125826
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Additive properties of fractal sets on the parabola

Abstract: Let \(0 \leq s \leq 1\), and let \(\mathbb{P} := \{(t,t^{2}) \in \mathbb{R}^{2} \colon t \in [-1,1]\}\). If \(K \subset \mathbb{P}\) is a closed set with \(\operatorname{dim}_{\mathrm{H}} K = s\), it is not hard to see that \(\operatorname{dim}_{\mathrm{H}} (K + K) \geq 2s\). The main corollary of the paper states that if \(0 < s < 1\), then adding \(K\) once more makes the sum slightly larger: \( \operatorname{dim}_{\mathrm{H}} (K + K + K) \geq 2s + \epsilon,\)where \(\epsilon = \epsilon(s) > 0\). Th… Show more

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Cited by 2 publications
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“…However, in the presence of some curvature the situation becomes much more interesting. Here, following the initial work of Orponen [46], there have been several papers [19,21,47] that prove quantitative Fourier decay estimates on average for (not necessarily dynamically defined) measures supported on such curves; however, we are not aware of such examples where pointwise estimates have been established.…”
mentioning
confidence: 99%
“…However, in the presence of some curvature the situation becomes much more interesting. Here, following the initial work of Orponen [46], there have been several papers [19,21,47] that prove quantitative Fourier decay estimates on average for (not necessarily dynamically defined) measures supported on such curves; however, we are not aware of such examples where pointwise estimates have been established.…”
mentioning
confidence: 99%