Fourier transform of self-affine measures

Abstract

Suppose F is a self-affine set on Rd, d≥ 2, which is not a singleton, associated to affine contractions fj = Aj + bj, Aj ∈ GL(d,R), bj ∈ Rd, j ∈ A, for some finite A. We prove that if the group generated by the matrices Aj, j ∈ A, forms a proximal and totally irreducible subgroup of GL(d,R), then any self-affine measure μ = Σ pj fj μ, Σ pj = 1, 0 < pj < 1, j ∈ A, on F is a Rajchman measure: the Fourier transform μ() 0 as || ∞. As an application this shows that self-affine sets with proximal and totally irreducible linear parts are sets of rectangular multiplicity for multiple trigonometric series. Moreover, if the Zariski closure of is connected real split Lie group in the Zariski topology, then μ() has a power decay at infinity. Hence μ is Lp improving for all 1 < p < ∞ and F has positive Fourier dimension. In dimension d = 2,3 the irreducibility of and non-compactness of the image of in PGL(d,R) is enough for power decay of μ. The proof is based on quantitative renewal theorems for random walks on the sphere Sd-1.