A decay estimate for the Fourier transform of certain singular measures in R4 and applications

Abstract

We consider, for a class of functions : R2 \ 0 \ R2 satisfying a nonisotropic homogeneity condition, the Fourier transform μ of the Borel measure on R4 defined by \[ μ(E) = ∫U E(x, (x)) \, dx \] where E is a Borel set of R4 and U = \ (tα1, tα2s) : c < s < d, \, 0 < t < 1 \. The aim of this article is to give a decay estimate for μ, for the case where the set of nonelliptic points of is a curve in U \ 0 \. From this estimate we obtain a restriction theorem for the usual Fourier transform to the graph of U : U R2. We also give Lp-improving properties for the convolution operator Tμ f = μ f.