The sharp Lp decay of oscillatory integral operators with certain homogeneous polynomial phases in several variables

Abstract

We obtain the Lp decay of oscillatory integral operators Tλ with certain homogeneous polynomial phase of degree d in (n+n)-dimensions. In this paper we require that d>2n. If d/(d-n)<p<d/n, the decay is sharp and the decay rate is related to the Newton distance. In the case of p=d/n or d/(d-n), we also obtain the almost sharp decay, here "almost" means the decay contains a (λ) term. For otherwise, the Lp decay of Tλ is also obtained but not sharp. A counterexample also arises in this paper to show that d/(d-n)≤ p≤ d/n is not necessary to guarantee the sharp decay.