Interpolating with generalized Assouad dimensions

Abstract

The ϕ-Assouad dimensions are a family of dimensions which interpolate between the upper box and Assouad dimensions. They are a generalization of the well-studied Assouad spectrum with a more general form of scale sensitivity that is often closely related to &#34;phase-transition&#34; phenomena in sets. In this article we establish a number of key properties of the ϕ-Assouad dimensions which help to clarify their behaviour. We prove for any bounded doubling metric space F and α∈R satisfying dimBF<α≤dimA F that there is a function ϕ so that the ϕ-Assouad dimension of F is equal to α. We further show that the &#34;upper&#34; variant of the dimension is fully determined by the ϕ-Assouad dimension, and that homogeneous Moran sets are in a certain sense generic for these dimensions. Further, we study explicit examples of sets where the Assouad spectrum does not reach the Assouad dimension. We prove a precise formula for the ϕ-Assouad dimensions for Galton--Watson trees that correspond to a general class of stochastically self-similar sets, including Mandelbrot percolation. This result follows from two results which may be of general interest: a sharp large deviations theorem for Galton--Watson processes with bounded offspring distribution, and a Borel--Cantelli-type lemma for infinite structures in random trees. Finally, we obtain results on the ϕ-Assouad dimensions of overlapping self-similar sets and decreasing sequences with decreasing gaps.