Fourier transform of nonlinear images of self-similar measures: quantitative aspects

Abstract

This paper relates to the Fourier decay properties of images of self-similar measures μ on Rk under nonlinear smooth maps f Rk R. For example, we prove that if the linear parts of the similarities defining μ commute and the graph of f has nonvanishing Gaussian curvature, then the Fourier dimension of the image measure is at least \ 2(2κ2 - k)4 + 2κ* - k , 0 \, where κ2 is the lower correlation dimension of μ and κ* is the Assouad dimension of the support of μ. Under some additional assumptions on μ, we use recent breakthroughs in the fractal uncertainty principle to obtain further improvements for the decay exponents. We give several applications to nonlinear arithmetic of self-similar sets F in the line. For example, we prove that if H F > (65 - 5)/4 = 0.765… then the arithmetic product set F · F = \ xy : x,y ∈ F \ has positive Lebesgue measure, while if H F > (-3 + 41)/4 = 0.850… then F · F · F has non-empty interior. One feature of the above results is that they do not require any separation conditions on the self-similar sets.