Sharp endpoint multilinear estimates for oscillatory integrals and spectral clusters
Abstract
We prove sharp k-linear Lp estimates for Carleson--Sjölin oscillatory integral operators with arbitrary separated frequency scales for all k 2 and 1 p ∞. The estimates are sharp, including the endpoint logarithmic behavior for general Carleson--Sjölin phases. Moreover, we obtain log-free endpoint bilinear spectral cluster estimates on every closed three-dimensional Riemannian manifold, resolving a problem of Burq--Gérard--Tzvetkov. As a consequence, we establish sharp k-linear Lp spectral cluster estimates for all k 2 and 1 p ∞.
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