Stationary phase with Cauchy singularity. A critical point of signature (+,-)

Abstract

Asymptotic expressions for an integral appearing in the solution of a d-bar problem are presented. The integral is a solid Cauchy transform of a function with a rapidly oscillating phase with a small parameter h, 0<h 1. Whereas standard steepest descent approaches can be applied to the case where the stationary points of the phase ωk, k=1,…, N are far from the singularity ζ of the integrand, a polarization approach is proposed for the case that |ζ-ωk|<O(h) for some k. In this case the problem is studied in C2 (ω:=ω is treated as an independent variable) on steepest descent contours. An application of Stokes' theorem allows for a decomposition of the integral into three terms for which asymptotic expressions in terms of special functions are given.