On L2 estimates for quadratic images of product Frostman measures

Abstract

Let f∈ R[x,y,z] be a fixed non-degenerate quadratic polynomial. Given an α-Frostman probability measure μ supported on [0,1] with α∈(0,1), consider the pushforward measure =f\#(μ×μ×μ) on R. We prove the following L2 energy estimate: for a fixed nonnegative Schwartz function with ∫=1 and δ(t)=δ-1(t/δ), there exist ε>0 and δ0>0 (depending only on α and the coefficients of f) such that \[ ∫ R(δ*(t))2\,dt \ \ δα+ε-1 for all δ∈(0,δ0]. \] The proof expands the L2 energy into a weighted six-fold coincidence integral and reduces the main contribution to a planar incidence problem after a controlled change of variables. The key new input is an incidence estimate for point sets that arise as bi-Lipschitz images of a Cartesian product M× M of a δ-separated and non-concentrated set M, yielding a power saving beyond what is available from separation and non-concentration alone. We also give examples showing that bounded support and Frostman-type hypotheses are necessary for such L2 control.