On Astala's theorem for martingales and Fourier multipliers

Abstract

We exhibit a large class of symbols m on d, d≥ 2, for which the corresponding Fourier multipliers Tm satisfy the following inequality. If D, E are measurable subsets of d with E⊂eq D and |D|<∞, then ∫D E |TmE(x)|dx≤ cases |E|+|E|(|D|2|E|), & if|E|<|D|/2, |D E|+12|D E| (|E||D E|), & if|E|≥ |D|/2. cases. Here |·| denotes the Lebesgue measure on d. When d=2, these multipliers include the real and imaginary parts of the Beurling-Ahlfors operator B and hence the inequality is also valid for B with the right-hand side multiplied by 2. The inequality is sharp for the real and imaginary parts of B. This work is motivated by K. Astala's celebrated results on the Gehring-Reich conjecture concerning the distortion of area by quasiconformal maps. The proof rests on probabilistic methods and exploits a family of appropriate novel sharp inequalities for differentially subordinate martingales. These martingale bounds are of interest on their own right.