After the torch of Anders Kock [6], we will establish the Baker-Campbell- Hausdor formula as well as the Zassenhaus formula in the theory of Lie groups
We prove a convergence result for the Campbell\u2013Baker\u2013Hausdorff\u2013Dynkin series in infin...
Groupoids provide a more appropriate framework for differential geometry than principal bundles. Syn...
Le travail de thèse contribue à établir des liens entre structures algébriques non-linéaires, décrit...
After the torch of Anders Kock [Taylor series calculus for ring objects of line type, Journal of Pur...
AbstractIn his book (“Lie Algebras,” Interscience, 1962) Jacobson proves the Campbell-Hausdorff form...
Lie Groups occur in math and physics as representations of continuous symmetries and are often descr...
In his book (“Lie Algebras,” Interscience, 1962) Jacobson proves the Campbell-Hausdorff formula for ...
International audienceThe well-known Baker-Campbell-Hausdorff theorem in Lie theory says that the lo...
AbstractIn this paper the problem of the convergence of the Baker–Campbell–Hausdorff series for Z=lo...
Empirical thesis.Bibliography: pages 159-161.Introduction -- 1. Synthetic differential geometry -- 2...
A simple algorithm, which exploits the associativity of the BCH formula, and that can be generalized...
Motivated by the importance of the Campbell, Baker, Hausdorff, Dynkin Theorem in many different bran...
Weil prolongations of a Lie group are naturally Lie groups. It is not known in the theory of in nite...
The aim of this lecture is to provide an overview of facts and references about past and recent resu...
We study the fundamental properties of curvature in groupoids within theframework of synthetic diffe...
We prove a convergence result for the Campbell\u2013Baker\u2013Hausdorff\u2013Dynkin series in infin...
Groupoids provide a more appropriate framework for differential geometry than principal bundles. Syn...
Le travail de thèse contribue à établir des liens entre structures algébriques non-linéaires, décrit...
After the torch of Anders Kock [Taylor series calculus for ring objects of line type, Journal of Pur...
AbstractIn his book (“Lie Algebras,” Interscience, 1962) Jacobson proves the Campbell-Hausdorff form...
Lie Groups occur in math and physics as representations of continuous symmetries and are often descr...
In his book (“Lie Algebras,” Interscience, 1962) Jacobson proves the Campbell-Hausdorff formula for ...
International audienceThe well-known Baker-Campbell-Hausdorff theorem in Lie theory says that the lo...
AbstractIn this paper the problem of the convergence of the Baker–Campbell–Hausdorff series for Z=lo...
Empirical thesis.Bibliography: pages 159-161.Introduction -- 1. Synthetic differential geometry -- 2...
A simple algorithm, which exploits the associativity of the BCH formula, and that can be generalized...
Motivated by the importance of the Campbell, Baker, Hausdorff, Dynkin Theorem in many different bran...
Weil prolongations of a Lie group are naturally Lie groups. It is not known in the theory of in nite...
The aim of this lecture is to provide an overview of facts and references about past and recent resu...
We study the fundamental properties of curvature in groupoids within theframework of synthetic diffe...
We prove a convergence result for the Campbell\u2013Baker\u2013Hausdorff\u2013Dynkin series in infin...
Groupoids provide a more appropriate framework for differential geometry than principal bundles. Syn...
Le travail de thèse contribue à établir des liens entre structures algébriques non-linéaires, décrit...