On parametric Borel summability for linear singularly perturbed Cauchy problems with linear fractional transforms
Abstract
We consider a family of linear singularly perturbed Cauchy problems which combines partial differential operators and linear fractional transforms. We construct a collection of holomorphic solutions on a full covering by sectors of a neighborhood of the origin in with respect to the perturbation parameter . This set is built up through classical and special Laplace transforms along piecewise linear paths of functions which possess exponential or super exponential growth/decay on horizontal strips. A fine structure which entails two levels of Gevrey asymptotics of order 1 and so-called order is witnessed. Furthermore, unicity properties regarding the asymptotic layer are observed and follow from results on summability w.r.t a particular strongly regular sequence recently obtained in a previous study.
Cite
@article{arxiv.1802.09279,
title = {On parametric Borel summability for linear singularly perturbed Cauchy problems with linear fractional transforms},
author = {Alberto Lastra and Stéphane Malek},
journal= {arXiv preprint arXiv:1802.09279},
year = {2018}
}