Initial L2×·s× L2 bounds for multilinear operators

Abstract

The Lp boundedness theory of convolution operators is based on an initial L2 L2 estimate derived from the Fourier transform. The corresponding theory of multilinear operators lacks such a simple initial estimate in view of the unavailability of Plancherel's identity in this setting, and up to now it has not been clear what a natural initial estimate might be. In this work we achieve exactly this goal, i.e., obtain an initial L2×·s× L2 L2/m estimate for general building blocks of m-linear multiplier operators. We apply this result to deduce analogous bounds for multilinear rough singular integrals, multipliers of H\"ormander type, and multipliers whose derivatives satisfy qualitative estimates.