How to prove that some Bernoulli convolution has the weak Gibbs property

Abstract

In this paper we give an example of uniform convergence of the sequence of column vectors A1… AnV A1… AnV, Ai∈\A,B,C\, A,B,C being some (0,1)-matrices of order 7 with much null entries, and V a fixed positive column vector. These matrices come from the study of the Bernoulli convolution in the base β>1 such that β3=2β2-β+1, that is, the (continuous singular) probability distribution of the random variable (β-1)Σn=1∞ωnβn when the independent random variables ωn take the values 0 and 1 with probability 12. In the last section we deduce, from the uniform convergence of A1… AnV A1… AnV, the Gibbs and the multifractal properties of this measure.