Self-similar measures with unusual local dimension properties

Abstract

Let μ be a self-similar measure satisfying the finite type condition. It is known that the set of attainable local dimensions for such a measure is a union of disjoint intervals, where some intervals may be degenerate points. Despite this, it has not been shown if this full complexity of attainable local dimensions is achievable. In this paper we give two different constructions. The first is a measure μ where the set of all attainable local dimensions is the union of an interval union and an arbitrary number of disjoint points. The second is a measure μ where the set of all attainable local dimensions is the union of an arbitrary number of disjoint intervals. As an application to these construction, we study the multi-fractal spectrum fμ(α) and the Lq-spectrum τμ(q) of these measures. We given an example of a μ where fμ(α) is not concave, and where τμ(q) has two points of non-differentiability.