Quadratic spectral concentration of characteristic functions

Abstract

It is known that the inequality align*∫-W/2W/2|f()|2d≤ ∫-W/2W/2||f|*()|2d align* between the quadratic spectral concentration of a function and that of its decreasing rearrangement holds for any function f∈ L2,\;|supp f|=T, if and only if the product WT does not exceed the critical value ≈ 0.884. We show that by restricting ourselves to characteristic functions we can enlarge this range up to WT≤ 4/3. Besides, we establish various properties of minimizers of the difference ∫-W/2W/2|A*()|2d-∫-W/2W/2|A()|2d over sets A of finite measure and prove that this difference is non-negative for all W,T>0 if A is the union of two intervals. As a corollary, we obtain a sharp (up to a constant) estimate for the L2-norms of non-harmonic trigonometric polynomials with alternating coefficients 1.