Asymptotics for the Moments of Singular Distributions

In this paper, we present results in the Gevrey asymptotics which correspond to some existing results concerning asymptotic solutions in the Poincare asymptotics of singularly perturbed ordinary differential equations. The main idea is based on a characterization of the Gevrey flat functions and a c

## Abstract The Khayat‐Wilton singularity cancellation technique has been adapted for computing the potential integrals involving the 3D Green's function and the linearly‐phased Rao‐Wilton‐Glisson (LP‐RWG) basis functions. The LP‐RWG basis functions are used to expand the induced currents in terms

Given a multivariate generating function F(z 1 , ..., z d )=; a r1, ..., rd z r1 1 • • • z rd d , we determine asymptotics for the coefficients. Our approach is to use Cauchy's integral formula near singular points of F, resulting in a tractable oscillating integral. This paper treats the case where