A three term sublevel set inequality

Abstract

Let B be a ball in R2. For j=1,2,3 let j:B R1 be real analytic submersions, and let aj be real analytic coefficient functions. To any >0 and any Lebesgue measurable functions fj: R1 C associate the sublevel set S = S(f1,f2,f3,) = \x∈ B: |Σj=13 aj(x)(fjj)(x)|<\. Let S' = \x∈ S: j|fjj(x)| 1\. Our main result is an upper bound, under certain hypotheses on the data j,aj for the Lebesgue measure of S' of the form |S'| cγ for some constants c,γ>0 that depend on the data aj,j but not on the functions fj or parameter . The main hypothesis is that in any connected open subset of B, the only real analytic solution (f1,f2,f3) of Σj aj(x)(fjj)(x) 0 is the trivial solution fk=0\ ∀\,k. Certain auxiliary hypotheses, which hold for generic j,aj, are also imposed. The case in which all coefficients aj are constant was previously known. This result is a principal ingredient in an analysis, in a companion paper, of related implicitly oscillatory integrals with four factors fj. Certain related results are also discussed. In particular, a generalization to arbitrarily many summands fj is obtained for the special case in which all mappings j are linear.