The Convenient Setting for non-Quasianalytic Denjoy--Carleman Differentiable Mappings

Andreas Kriegl; Peter W. Michor; Armin Rainer

doi:10.1016/j.jfa.2009.03.003.x

The Convenient Setting for non-Quasianalytic Denjoy--Carleman Differentiable Mappings

Functional Analysis 2009-10-01 v3 Classical Analysis and ODEs

Authors: Andreas Kriegl , Peter W. Michor , Armin Rainer

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Abstract

For Denjoy--Carleman differential function classes $C^M$ where the weight sequence $M=(M_k)$ is logarithmically convex, stable under derivations, and non-quasianalytic of moderate growth, we prove the following: A mapping is $C^M$ if it maps $C^M$ -curves to $C^M$ -curves. The category of $C^M$ -mappings is cartesian closed in the sense that $C^M(E,C^M(F,G))\cong C^M(E\x F, G)$ for convenient vector spaces. Applications to manifolds of mappings are given: The group of $C^M$ -diffeomorphisms is a $C^M$ -Lie group but not better.

Keywords

mapping theory diffeomorphism groups algebraic topology

Cite

@article{arxiv.0804.2995,
  title  = {The Convenient Setting for non-Quasianalytic Denjoy--Carleman Differentiable Mappings},
  author = {Andreas Kriegl and Peter W. Michor and Armin Rainer},
  journal= {arXiv preprint arXiv:0804.2995},
  year   = {2009}
}

Comments

LaTeX, 29 pages, Some misprints corrected. Again some misprints corrected

The Convenient Setting for non-Quasianalytic Denjoy--Carleman Differentiable Mappings

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