Smoothing operators for vector-valued functions and extension operators

Abstract: Let Ω ⊆ R d be open and ℓ ∈ N0 ∪ {∞}. Given a locally convex topological vector space F , endow C ℓ (Ω, F ) with the compact-open C ℓtopology. For ℓ < ∞, we describe a sequence (Sn) n∈N of continuous linear operators Sn :Moreover, we study the existence of continuous linear right inverses for restriction maps C ℓ (R d , F ) → C ℓ (R, F ), γ → γ|R for subsets R ⊆ R d with dense interior. As an application, we construct continuous linear right inverses for restriction operators between spaces of sections in vect… Show more

“…Then, N q := {y ∈ E : q(y) = 0} is a closed vector subspace of E and y + N q q := q(y) for y ∈ E defines a norm on E q := E/N q making the map α q : E → E q , y → y + N q continuous linear. By (12), we have…”

“…In the preceding situation, i∈I E i is an equivariant L-vector bundle of class C r K over M. Remark 12. If M is a C r R -manifold, then every x ∈ M has an open neighbourhood U which is C r R -diffeomorphic to a convex open subset W in the modelling space Z of M. If W can be chosen C r R -paracompact, then every C r R -vector bundle over U is trivialisable (see [12] (Corollary 15.10)). The latter condition is satisfied, for example, if Z is finite-dimensional, a Hilbert space, or a countable direct limit of finite-dimensional vector spaces (and hence a nuclear Silva space), cf.…”

“…We show that the Poisson bracket associated with a continuous Lie bracket is always continuous (Theorem 1) and that the linear map C ∞ (E, R) → C ∞ (E, E) taking a smooth function to the associated Hamiltonian vector field is continuous (Theorem 2). Ideas from [8] and the current article were also taken further in [12] (Section 13).…”

Aspects of Differential Calculus Related to Infinite-Dimensional Vector Bundles and Poisson Vector Spaces

“…Then, N q := {y ∈ E : q(y) = 0} is a closed vector subspace of E and y + N q q := q(y) for y ∈ E defines a norm on E q := E/N q making the map α q : E → E q , y → y + N q continuous linear. By (12), we have…”

“…In the preceding situation, i∈I E i is an equivariant L-vector bundle of class C r K over M. Remark 12. If M is a C r R -manifold, then every x ∈ M has an open neighbourhood U which is C r R -diffeomorphic to a convex open subset W in the modelling space Z of M. If W can be chosen C r R -paracompact, then every C r R -vector bundle over U is trivialisable (see [12] (Corollary 15.10)). The latter condition is satisfied, for example, if Z is finite-dimensional, a Hilbert space, or a countable direct limit of finite-dimensional vector spaces (and hence a nuclear Silva space), cf.…”

“…We show that the Poisson bracket associated with a continuous Lie bracket is always continuous (Theorem 1) and that the linear map C ∞ (E, R) → C ∞ (E, E) taking a smooth function to the associated Hamiltonian vector field is continuous (Theorem 2). Ideas from [8] and the current article were also taken further in [12] (Section 13).…”

Aspects of Differential Calculus Related to Infinite-Dimensional Vector Bundles and Poisson Vector Spaces

“…R -paracompact, then every C r R -vector bundle over U is trivializable (see [25,Corollary 15.10]). The latter condition is satisfied, for example, if Z is finite dimensional, a Hilbert space, or a countable direct limit of finite-dimensional vector spaces (cf.…”

Aspects of differential calculus related to infinite-dimensional vector bundles and Poisson vector spaces

“…may not be open, but has dense interior U o and is locally convex in the sense that each x ∈ U has a convex neighbourhood in U , following [15] a map f : [13], cf. [17]).…”

Manifolds of mappings on cartesian products