%0 Journal Article 
%A Lastra Sedano, Alberto
%A Malek, Stephane
%T On parametric Gevrey asymptotics for initial value  problems with infinite order irregular singularity and linear fractional  transforms
%D 2018
%@ 1687-1839
%U http://hdl.handle.net/10017/41476
%X This paper is a continuation of the work (Lastra and Malek in J. Differ. Equ. 259(10):5220-5270, 2015) where singularly perturbed nonlinear PDEs have been studied from an asymptotic point of view. Here, the partial differential operators are combined with particular Moebius transforms in the time variable. As a result, the leading term of the main problem needs to be regularized by means of a singularly perturbed infinite order formal irregular operator that allows us to construct a set of genuine solutions in the form of a Laplace transform in time and an inverse Fourier transform in space. Furthermore, we obtain Gevrey asymptotic expansions for these solutions of some order K > 1 in the perturbation parameter.
%K Asymptotic expansion
%K Borel-Laplace transform
%K Fourier transform
%K Initial value problem
%K Difference equation
%K Formal power series
%K Nonlinear integro-differential equation
%K Nonlinear partial differential equation
%K Singular perturbation
%K Matemáticas
%K Mathematics
%~ Biblioteca Universidad de Alcala