Fast numerical computations of oscillatory singular integrals (Q1909422)

The oscillatory singular integrals we consider are \[ T(f)(x)= \int_{\mathbb{R}^n} e^{i\pi p(x,y)}k(x- y)f(y)dy,\tag{1} \] where \(k(x)\) is a Calderón-Zygmund standard kernel, i.e., \(k(x)= \Omega(x)/|x|^n\), where \(\Omega(x)\) is a homogeneous function and has enough smoothness on the unit sphere of \(\mathbb{R}^n\), and \(p(x,y)\) is an arbitrary real-valued polynomial. The purpose of this note is to prove the following Theorem. The oscillatory singular integral (1) becomes sparse when represented in an appropriate local cosine orthonormal basis.