Lp Fourier asymptotics, Hardy type inequality and fractal measures

Abstract

Suppose μ is an α-dimensional fractal measure for some 0<α<n. Inspired by the results proved by R. Strichartz in 1990, we discuss the Lp-asymptotics of the Fourier transform of fdμ by estimating bounds of L→∞\ 1Lk ∫||≤ L\ |fdμ()|pd, for f∈ Lp(dμ) and 2<p<2n/α. In a different direction, we prove a Hardy type inequality, that is, ∫|f(x)|p(μ(Ex))2-pdμ(x)≤ C\ L→∞ 1Ln-α ∫BL(0) |fdμ()|pd where 1≤ p≤ 2 and Ex=E(-∞,x1]×(-∞,x2]...(-∞,xn] for x=(x1,...xn)∈n generalizing the one dimensional results proved by Hudson and Leckband in 1992.