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Auteurs principaux: Jiménez-Garrido, Javier, Miguel-Cantero, Ignacio, Sanz, Javier, Schindl, Gerhard
Format: Preprint
Publié: 2026
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Accès en ligne:https://arxiv.org/abs/2604.20758
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author Jiménez-Garrido, Javier
Miguel-Cantero, Ignacio
Sanz, Javier
Schindl, Gerhard
author_facet Jiménez-Garrido, Javier
Miguel-Cantero, Ignacio
Sanz, Javier
Schindl, Gerhard
contents We study the stability under point-wise product and under composition in Carleman classes of holomorphic functions, defined on sectors of the Riemann surface of the logarithm, and admitting a uniform asymptotic expansion with remainders controlled by a given sequence of positive real numbers $\mathbf{M}$. On the one hand, the well-known conditions of algebrability and Faà di Bruno, imposed on the sequence $\mathbf{M}$, ensure the desired stability with respect to each operation in both the Roumieu and the Beurling settings. On the other hand, these conditions turn out to be necessary for the corresponding stability in the Roumieu case as long as the existence of suitable characteristic functions, in a precise sense, is guaranteed within the class. The construction of such functions rests on classical results of B. Rodríguez-Salinas, and is given in detail. Our results are inspired by, and thoroughly generalize, several partial statements by G.~Auberson and G.~Mennessier for Gevrey classes of order 1.
format Preprint
id arxiv_https___arxiv_org_abs_2604_20758
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Stability under product and composition for uniform Carleman asymptotic expansions
Jiménez-Garrido, Javier
Miguel-Cantero, Ignacio
Sanz, Javier
Schindl, Gerhard
Complex Variables
Primary 30E15, 30H50, secondary 46J15
We study the stability under point-wise product and under composition in Carleman classes of holomorphic functions, defined on sectors of the Riemann surface of the logarithm, and admitting a uniform asymptotic expansion with remainders controlled by a given sequence of positive real numbers $\mathbf{M}$. On the one hand, the well-known conditions of algebrability and Faà di Bruno, imposed on the sequence $\mathbf{M}$, ensure the desired stability with respect to each operation in both the Roumieu and the Beurling settings. On the other hand, these conditions turn out to be necessary for the corresponding stability in the Roumieu case as long as the existence of suitable characteristic functions, in a precise sense, is guaranteed within the class. The construction of such functions rests on classical results of B. Rodríguez-Salinas, and is given in detail. Our results are inspired by, and thoroughly generalize, several partial statements by G.~Auberson and G.~Mennessier for Gevrey classes of order 1.
title Stability under product and composition for uniform Carleman asymptotic expansions
topic Complex Variables
Primary 30E15, 30H50, secondary 46J15
url https://arxiv.org/abs/2604.20758