Functional analytic issues in Z2n-Geometry
Abstract
We show that the function sheaf of a Z2n-manifold is a nuclear Fr\'echet sheaf of Z2n-graded Z2n-commutative associative unital algebras. Further, we prove that the components of the pullback sheaf morphism of a Z2n-morphism are all continuous. These results are essential for the existence of categorical products in the category of Z2n-manifolds. All proofs are self-contained and explicit.
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