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

Abstract

The goal of this paper is to establish polynomial Fourier decay for images of self-similar measures μ on Rk under sufficiently nonlinear real-analytic maps f Rk Rd. For example, we prove that if f is analytic on Rk, its graph does not lie in an affine hyperplane in Rk+d, and μ is not supported in an affine hyperplane in Rk, then the image measure has polynomial Fourier decay. Key steps in the proof include establishing a uniform Lojasiewicz-type inequality for self-similar measures, and using the decay of the Fourier transform of μ outside a very small exceptional set of frequencies. As an application of our results, we prove polynomial Fourier decay for self-conformal measures on C for a large class of complex analytic IFSs which are not self-similar but are conjugate to a linear IFS via an analytic map.