Fourier decay bound and differential images of self-similar measures

Abstract

In this note, we investigate C2 differential images of the homogeneous self-similar measure associated with an IFS I=\ x+aj\j=1m satisfying the strong separation condition and a positive probability vector p. It is shown that the Fourier transforms of such image measures have power decay for any contractive ratio ∈ (0, 1/m), any translation vector a=(a1, …, am) and probability vector p, which extends a result of Kaufman on Bernoulli convolutions. Our proof relies on a key combinatorial lemma originated from Erdos, which is important in estimating the oscillatory integrals. An application to the existence of normal numbers in fractals is also given.