On Polynomial Carleson operators along quadratic hypersurfaces
Abstract
We prove that a maximally modulated singular oscillatory integral operator along a hypersurface defined by (y,Q(y))⊂eq Rn+1, for an arbitrary non-degenerate quadratic form Q, admits an a priori bound on Lp for all 1<p<∞, for each n ≥ 2. This operator takes the form of a polynomial Carleson operator of Radon-type, in which the maximally modulated phases lie in the real span of \p2,…,pd\ for any set of fixed real-valued polynomials pj such that pj is homogeneous of degree j, and p2 is not a multiple of Q(y). The general method developed in this work applies to quadratic forms of arbitrary signature, while previous work considered only the special positive definite case Q(y)=|y|2.
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