Manifolds of mappings on Cartesian products

Abstract: Given smooth manifolds $$M_1,\ldots , M_n$$ M 1 , … , M n (which may have a boundary or corners), a smooth manifold N modeled on locally convex spaces and $$\alpha \in ({{\mathbb {N}}}_0\cup \{\infty \})^n$$ α … Show more

“…A similar notion of canonical manifold exists also for spaces of finitely often differentiable mappings (Amiri et al, 2020;Glöckner and Schmeding, 2022). We hasten to remark that the usual constructions of manifolds of mappings yield canonical manifold structures (see Appendix C).…”

An Introduction to Infinite-Dimensional Differential Geometry

“…A similar notion of canonical manifold exists also for spaces of finitely often differentiable mappings (Amiri et al, 2020;Glöckner and Schmeding, 2022). We hasten to remark that the usual constructions of manifolds of mappings yield canonical manifold structures (see Appendix C).…”

An Introduction to Infinite-Dimensional Differential Geometry

“…A similar notion of canonical manifold exists also for spaces of finitely often differentiable mappings, [AGS20,GS21]. We hasten to remark that the usual constructions of manifolds of mappings yield canonical manifold structures (cf.…”

An introduction to infinite-dimensional differential geometry