Attainable forms of intermediate dimensions
Amlan Banaji, Alex Rutar
Abstract
The intermediate dimensions are a family of dimensions which interpolate between the Hausdorff and box dimensions of sets. We prove a necessary and sufficient condition for a given function \(h(\theta)\) to be realized as the intermediate dimensions of a bounded subset of \(\mathbb{R}^d\). This condition is a straightforward constraint on the Dini derivatives of \(h(\theta)\), which we prove is sharp using a homogeneous Moran set construction.
Topics & Concepts
Bounded functionHomogeneousMathematicsConstraint (computer-aided design)Hausdorff dimensionSet (abstract data type)Function (biology)Hausdorff spacePure mathematicsHausdorff measureCombinatoricsMathematical analysisGeometryComputer scienceBiologyEvolutionary biologyProgramming languageMathematical Dynamics and FractalsAdvanced Topology and Set Theory