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The study of diffeomorphism group actions requires methods of infinite dimensional analysis. Really convenient tools can be found in the Frölicher - Kriegl - Michor differentiation theory and its geometrical aspects. In terms of it we develop the calculus of various types of one parameter diffeomorphism groups in infinite dimensional spaces with smooth structure. Some spectral properties of the derivative of exponential mapping for manifolds are given.

Caractérisation variationnelle globale des flots canoniques et de contact dans leurs groupes de difféomorphismes

Ernesto Lacomba, Lucette Losco (1986)

Annales de l'I.H.P. Physique théorique

Characterizing infinite dimensional manifolds topologically

Robert D. Edwards (1978/1979)

Séminaire Bourbaki

Classification analytique de structures de Poisson

Philipp Lohrmann (2009)

Bulletin de la Société Mathématique de France

Notre étude porte sur une catégorie de structures de Poisson singulières holomorphes au voisinage de $0 \in ℂ^{n}$ et admettant une forme normale formelle polynomiale i.e. un nombre fini d’invariants formels. Les séries normalisantes sont divergentes en général. On montre l’existence de transformations normalisantes holomorphes sur des domaines sectoriels de la forme $a < \arg x^{R} < b$ , où $x^{R}$ est un monôme associé au problème. Il suit une classification analytique.

Classification of free actions by some metacyclic groups on $S^{2 n - 1}$

C. B. Thomas (1980)

Annales scientifiques de l'École Normale Supérieure

Closed curves and circle homomorphisms in groups of diffeomorphisms

Reinhard Schultz (1977)

Fundamenta Mathematicae

Closed surfaces with different shapes that are indistinguishable by the SRNF

Eric Klassen, Peter W. Michor (2020)

Archivum Mathematicum

The Square Root Normal Field (SRNF), introduced by Jermyn et al. in [5], provides a way of representing immersed surfaces in $ℝ^{3}$ , and equipping the set of these immersions with a “distance function" (to be precise, a pseudometric) that is easy to compute. Importantly, this distance function is invariant under reparametrizations (i.e., under self-diffeomorphisms of the domain surface) and under rigid motions of $ℝ^{3}$ . Thus, it induces a distance function on the shape space of immersions, i.e., the space...

Commutators of C...-diffeomorphisms. Appendix to "A Curious Remark Concerning the Geometric Transfer Map" by John N. Mather.

D.B.A. Epstein (1984)

Commentarii mathematici Helvetici

Commutators of Diffeomorphisms: II.

John N. Mather (1975)

Commentarii mathematici Helvetici

Commutators of diffeomorphisms, III: a group which is not perfect.

John N. Mather (1985)

Commentarii mathematici Helvetici

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Automorphism Groups of Second Order Differential Equations.

$B Γ$

Beiträge zur Lehre von n-fachen Mannigfaltigkeit [Book]

Bounded homeomorphisms over Hadamard manifolds.

Calculus of flows on convenient manifolds.

Calculus of flows on convenient manifolds

Caractérisation variationnelle globale des flots canoniques et de contact dans leurs groupes de difféomorphismes

Characterizing infinite dimensional manifolds topologically

Classification analytique de structures de Poisson

Classification of free actions by some metacyclic groups on $S^{2 n - 1}$

Closed curves and circle homomorphisms in groups of diffeomorphisms

Closed surfaces with different shapes that are indistinguishable by the SRNF

Cohomologie de Bismut-Nualart-Pardoux et cohomologie de Hochschild entière

Cohomologie quantique

Cohomology of Symplectomorphism Groups and Critical Values of Hamiltonians.

Cohomology of the Yang-Mills gauge orbit space and dimensional reduction

Comment choisir une connexion au hasard ?

Commutators of C...-diffeomorphisms. Appendix to "A Curious Remark Concerning the Geometric Transfer Map" by John N. Mather.

Commutators of Diffeomorphisms: II.

Commutators of diffeomorphisms, III: a group which is not perfect.

Currently displaying 41 – 60 of 422