Continuous right inverses for the asymptotic Borel map in ultraholomorphic classes via a Laplace-type transform

TL;DR

This paper introduces a novel Laplace-type transform method to construct continuous right inverses for the asymptotic Borel map in ultraholomorphic classes, enabling potential generalizations to multiple variables and broader summability theories.

Contribution

The paper presents a new approach using a truncated Laplace-type transform to construct right inverses, differing from previous Whitney extension methods, and paves the way for multivariable and generalized summability theories.

Findings

Introduces a Laplace-type transform for ultraholomorphic classes.

Provides a new construction of right inverses for the Borel map.

Suggests a framework for generalized summability beyond classical $k$-summability.

Abstract

A new construction of linear continuous right inverses for the asymptotic Borel map is provided in the framework of general Carleman ultraholomorphic classes in narrow sectors. Such operators were already obtained by V. Thilliez by means of Whitney extension results for non quasianalytic ultradifferentiable classes, due to J. Chaumat and A. M. Chollet, but our approach is completely different, resting on the introduction of a suitable truncated Laplace-type transform. This technique is better suited for a generalization of these results to the several variables setting. Moreover, it closely resembles the classical procedure in the case of Gevrey classes, so indicating the way for the introduction of a concept of summability which generalizes $k-$summability theory as developed by J. P. Ramis.