Asymptotic behavior of Lp estimates for a class of multipliers with homogeneous unimodular symbols

Abstract

We study Fourier multiplier operators associated with symbols (iλφ(/||)), where λ is a real number and φ is a real-valued C∞ function on the standard unit sphere Sn-1⊂Rn. For 1<p<∞ we investigate asymptotic behavior of norms of these operators on Lp(Rn) as |λ|∞. We show that these norms are always O((p-1) |λ|n|1/p-1/2|), where p is the larger number between p and its conjugate exponent. More substantially, we show that this bound is sharp in all even-dimensional Euclidean spaces Rn. In particular, this gives a negative answer to a question posed by Maz'ya. Concrete operators that fall into the studied class are the multipliers forming the two-dimensional Riesz group, given by the symbols r(i) (iλ). We show that their Lp norms are comparable to (p-1) |λ|2|1/p-1/2| for large |λ|, solving affirmatively a problem suggested in the work of Dragicevi\'c, Petermichl, and Volberg.