The Lq-spectrum for a class of self-similar measures with overlap

Abstract

It is known that the heuristic principle, referred to as the multifractal formalism, need not hold for self-similar measures with overlap, such as the 3-fold convolution of the Cantor measure and certain Bernoulli convolutions. In this paper we study an important function in the multifractal theory, the Lq-spectrum, τ (q), for measures of finite type, a class of self-similar measures that includes these examples. Corresponding to each measure, we introduce finitely many variants on the % Lq-spectrum which arise naturally from the finite type structure and are often easier to understand than τ . We show that τ is always bounded by the minimum of these variants and is equal to the minimum variant for q≥ 0. This particular variant coincides with the Lq-spectrum of the measure μ restricted to appropriate subsets of its support. If the IFS satisfies particular structural properties, which do hold for the above examples, then τ is shown to be the minimum of these variants for all q. Under certain assumptions on the local dimensions of μ, we prove that the minimum variant for q 0 coincides with the straight line having slope equal to the maximum local dimension of μ . Again, this is the case with the examples above. More generally, bounds are given for τ and its variants in terms of notions closely related to the local dimensions of μ .