Fourier extension for extremal quadratic submanifolds

Abstract

This note establishes the full range of Lp--Lq Fourier extension estimates for the model n-dimensional quadratic submanifold in Rn(n+3)/2 parametrized by γ(x1,…,xn) := (x1,…,xn, (xi xj)1 ≤ i ≤ j ≤ n). This class of submanifolds is extremal in the sense that an n-dimensional quadratic submanifold of Rd can only satisfy nontrivial Fourier extension inequalities when d ≤ n(n+3)2. The proof is via an inflation-type argument, with the unexpected twist that a significant amount of "overinflation" is necessary but in no way limits the sharpness of the argument.