Lp-Asymptotics of Fourier transform of fractal measures

Abstract

One of the basic questions in harmonic analysis is to study the decay properties of the Fourier transform of measures or distributions supported on thin sets in Rn. When the support is a smooth enough manifold, an almost complete picture is available. One of the early results in this direction is the following: Let f∈ Cc∞(Rn) and dσ be the surface measure on the sphere Sn-1⊂Rn. Then |fdσ()|≤\ C\ (1+||)-n-12. It follows that fdσ∈ Lp(Rn) for all p>2nn-1. This result can be extended to compactly supported measure on (n-1)-dimensional manifolds with appropriate assumptions on the curvature. Similar results are known for measures supported in lower dimensional manifolds in Rn under appropriate curvature conditions. However, the picture for fractal measures is far from complete. This thesis is a contribution to the study of asymptotic properties of the Fourier transform of measures supported in sets of fractal dimension 0<α<n for p≤ 2n/α. In 2004, Agranovsky and Narayanan proved that if μ is a measure supported in a C1-manifold of dimension d<n, then fdμ Lp(Rn) for 1≤ p≤ 2nd. We prove that the Fourier transform of a measure μE supported in a set E of fractal dimension α does not belong to Lp(Rn) for p≤ 2n/α. We also study Lp-asymptotics of the Fourier transform of fractal measures μE under appropriate conditions on E and give quantitative versions of the above statement by obtaining lower and upper bounds for the following: L→∞ 1Lk ∫||≤ L|fdμE()|pd.