Uniform bounds for Fourier transforms of surface measures in \(\mathbf{R}^3\) with nonsmooth density (Q2790740)

The decay rate of the Fourier transform of measures supported on real-analytic hypersurfaces in \(\mathbb R^3\) is studied. For this, special oscillatory integrals are considered. When viewed in terms of the hypersurface lying in \(\mathbb R^3\), the density in them is of the form \(K(x, y)g(z)\) supported near the origin and both \(K(x, y)\) and \(g(z)\) are allowed to have singularities. The obtained estimates ``generalize the previously known sharp uniform estimates fo when \(K(x, y)g(z)\) is smooth. The methods used in this paper involve an explicit two-dimensional resolution of singularities theorem, iterated twice, coupled with Van der Corput-type lemmas.''