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Remarks on the Schouten-Nijenhuis bracket

Michor, Peter W. — 1987

Proceedings of the Winter School "Geometry and Physics"

Knit products of graded Lie algebras and groups

Michor, Peter W. — 1990

Proceedings of the Winter School "Geometry and Physics"

Let $A = ⨁_{k} A_{k}$ and $B = ⨁_{k} B_{k}$ be graded Lie algebras whose grading is in $𝒵$ or $𝒵_{2}$ , but only one of them. Suppose that $(α, β)$ is a derivatively knitted pair of representations for $(A, B)$ , i.e. $α$ and $β$ satisfy equations which look “derivatively knitted"; then $A \oplus B : = ⨁_{k, l} (A_{k} \oplus B_{l})$ , endowed with a suitable bracket, which mimics semidirect products on both sides, becomes a graded Lie algebra $A \oplus_{(α, β)} B$ . This graded Lie algebra is called the knit product of $A$ and $B$ . The author investigates the general situation for any graded Lie subalgebras $A$ and $B$ of a graded...

The cohomology of the diffeomorphism group of a manifold is a Gelfand-Fuks cohomology

Michor, Peter W. — 1987

Proceedings of the 14th Winter School on Abstract Analysis

All natural concomitants of vector valued differential forms

Kolář, Ivan; Michor, Peter W. — 1987

Proceedings of the Winter School "Geometry and Physics"

A note on n-ary Poisson brackets

Michor, Peter W.; Vaisman, Izu — 2000

Proceedings of the 19th Winter School "Geometry and Physics"

An $n$ -ary Poisson bracket (or generalized Poisson bracket) on the manifold $M$ is a skew-symmetric $n$ -linear bracket ${, \dots,}$ of functions which is a derivation in each argument and satisfies the generalized Jacobi identity of order $n$ , i.e., $\sum_{σ \in S_{2 n - 1}} (sign σ) {{f_{σ_{1}}, \dots, f_{σ_{n}}}, f_{σ_{n + 1}}, \dots, f_{σ_{2 n - 1}}} = 0,$ $S_{2 n - 1}$ being the symmetric group. The notion of generalized Poisson bracket was introduced by et al. in [J. Phys. A, Math. Gen. 29, No. 7, L151–L157 (1996; Zbl 0912.53019) and J. Phys. A, Math. Gen. 30, No. 18, L607–L616 (1997; Zbl 0932.37056)]. They established...

The flow completion of a manifold with vector field.

Kamber, Franz W.; Michor, Peter W. — 2000

Electronic Research Announcements of the American Mathematical Society [electronic only]

Regular infinite dimensional Lie groups.

Kriegl, Andreas; Michor, Peter W. — 1997

Journal of Lie Theory

Vanishing geodesic distance on spaces of submanifolds and diffeomorphisms.

Michor, Peter W.; Mumford, David — 2005

Documenta Mathematica

Completing Lie algebra actions to Lie group actions.

Kamber, Franz W.; Michor, Peter W. — 2004

Electronic Research Announcements of the American Mathematical Society [electronic only]

On a construction connecting Lie algebras with general algebras

Michor, Peter W.; Ruppert, W.; Wegenkittl, K. — 1989

Proceedings of the Winter School "Geometry and Physics"

Tensor fields and connections on holomorphic orbit spaces of finite groups.

Kriegl, Andreas; Losik, Mark; Michor, Peter W. — 2003

Journal of Lie Theory

Extensions of super Lie algebras.

Alekseevsky, Dmitri; Michor, Peter W.; Ruppert, W.A.F. — 2005

Journal of Lie Theory

Lifting smooth curves over invariants for representations of compact Lie groups. II.

Kriegl, Andreas; Losik, Mark; Michor, Peter W.; Rainer, Armin — 2005

Journal of Lie Theory

The homotopy type of the space of degree 0 immersed plane curves.

Hiroki Kodama; Peter W. Michor — 2006

Revista Matemática Complutense

The space B = Imm (S, R) / Diff (S) of all immersions of rotation degree 0 in the plane modulo reparameterizations has homotopy groups π(B ) = Z, π(B ) = Z, and π(B ) = 0 for k ≥ 3.

Riemannian geometries on spaces of plane curves

Peter W. Michor; David Mumford — 2006

Journal of the European Mathematical Society

We study some Riemannian metrics on the space of smooth regular curves in the plane, viewed as the orbit space of maps from $S^{1}$ to the plane modulo the group of diffeomorphisms of $S^{1}$ , acting as reparametrizations. In particular we investigate the metric, for a constant $A > 0$ , $G_{c}^{A} (h, k) : = \int_{S^{1}} (1 + A κ_{c} {(θ)}^{2}) 〈 h (θ), k (θ) 〉 | c^{'} (θ) | d θ$ where $κ_{c}$ is the curvature of the curve $c$ and $h$ , $k$ are normal vector fields to $c$ . The term $A κ^{2}$ is a sort of geometric Tikhonov regularization because, for $A = 0$ , the geodesic distance between any two distinct curves is 0, while for $A > 0$ the...

Product preserving functors of infinite-dimensional manifolds

Andreas Kriegl; Peter W. Michor — 1996

Archivum Mathematicum

The theory of product preserving functors and Weil functors is partly extended to infinite dimensional manifolds, using the theory of $C^{\infty}$ -algebras.

Characterizing algebras of $C^{\infty}$ -functions on manifolds

Peter W. Michor; Jiří Vanžura — 1996

Commentationes Mathematicae Universitatis Carolinae

Among all $C^{\infty}$ -algebras we characterize those which are algebras of $C^{\infty}$ -functions on second countable Hausdorff $C^{\infty}$ -manifolds.

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 flows and fields

Markus Mauhart; Peter W. Michor — 1992

Archivum Mathematicum

The well known formula $[X, Y] = \frac{1}{2} \frac{\partial^{2}}{\partial t^{2}} |_{0} (_{- t}^{Y} ø_{- t}^{X} ø_{t}^{Y} ø_{t}^{X})$ for vector fields $X$ , $Y$ is generalized to arbitrary bracket expressions and arbitrary curves of local diffeomorphisms.

Natural transformations in differential geometry

Gerd Kainz; Peter W. Michor — 1987

Czechoslovak Mathematical Journal

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Currently displaying 1 – 20 of 21

Remarks on the Schouten-Nijenhuis bracket

Knit products of graded Lie algebras and groups

The cohomology of the diffeomorphism group of a manifold is a Gelfand-Fuks cohomology

All natural concomitants of vector valued differential forms

A note on n-ary Poisson brackets

The flow completion of a manifold with vector field.

Regular infinite dimensional Lie groups.

Vanishing geodesic distance on spaces of submanifolds and diffeomorphisms.

Completing Lie algebra actions to Lie group actions.

On a construction connecting Lie algebras with general algebras

Tensor fields and connections on holomorphic orbit spaces of finite groups.

Extensions of super Lie algebras.

Lifting smooth curves over invariants for representations of compact Lie groups. II.

The homotopy type of the space of degree 0 immersed plane curves.

Riemannian geometries on spaces of plane curves

Product preserving functors of infinite-dimensional manifolds

Characterizing algebras of $C^{\infty}$ -functions on manifolds

Closed surfaces with different shapes that are indistinguishable by the SRNF

Commutators of flows and fields

Natural transformations in differential geometry