If M is a manifold modelled over a nuclear Frechet space, the smooth vector fields, as in the finite dimensional case, may be identified with continuous derivations in the space E(M) of real C-infinity functions on M. This applies for instance to the loop groups and the group of diffeomorphisms of the circle: M = E(S-1, G), M = Diff(S-1)
AbstractThree data are interesting here: domains of integration, integrands and integration itself. ...
summary:Let $K$ be a field. The generalized Leibniz rule for higher derivations suggests the definit...
Click on the link to view the abstract.Keywords: Pointed Frölicher spaces; differential spaces; ...
If M is a manifold modelled over a nuclear Frechet space, the smooth vector fields, as in the finite...
If M is a manifold modelled over a nuclear Frechet space, the smooth vector fields, as in the finite...
Vector fields in infinite-dimensional manifolds play an important role in differential topology-geom...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
Let M2n+1 be a C(CPn) -singular manifold. We study functions and vector fields with isolated singula...
the group of diffeomorphisms 3) of a compact «-manifold M, possibly with boundary. The group 3D has ...
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
Three data are interesting here: domains of integration, integrands and integration itself. There is...
Three data are interesting here: domains of integration, integrands and integration itself. There is...
In this note, we exhibit explicitly the form of the “radiation field ” of F. G. Friedlander on two d...
AbstractThree data are interesting here: domains of integration, integrands and integration itself. ...
summary:Let $K$ be a field. The generalized Leibniz rule for higher derivations suggests the definit...
Click on the link to view the abstract.Keywords: Pointed Frölicher spaces; differential spaces; ...
If M is a manifold modelled over a nuclear Frechet space, the smooth vector fields, as in the finite...
If M is a manifold modelled over a nuclear Frechet space, the smooth vector fields, as in the finite...
Vector fields in infinite-dimensional manifolds play an important role in differential topology-geom...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
Let M2n+1 be a C(CPn) -singular manifold. We study functions and vector fields with isolated singula...
the group of diffeomorphisms 3) of a compact «-manifold M, possibly with boundary. The group 3D has ...
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
summary:The study of diffeomorphism group actions requires methods of infinite dimensional analysis....
Three data are interesting here: domains of integration, integrands and integration itself. There is...
Three data are interesting here: domains of integration, integrands and integration itself. There is...
In this note, we exhibit explicitly the form of the “radiation field ” of F. G. Friedlander on two d...
AbstractThree data are interesting here: domains of integration, integrands and integration itself. ...
summary:Let $K$ be a field. The generalized Leibniz rule for higher derivations suggests the definit...
Click on the link to view the abstract.Keywords: Pointed Frölicher spaces; differential spaces; ...
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