Principal bundles in the category of Z2n-manifolds

Abstract

We introduce and examine the notion of principal Z2n-bundles, i.e., principal bundles in the category of Z2n-manifolds. The latter are higher graded extensions of supermanifolds in which a Z2n-grading replaces Z2-grading. These extensions have opened up new areas of research of great interest in both physics and mathematics. In principle, the geometry of Z2n-manifolds is essentially different than that of supermanifolds, as for n>1 we have formal variables of even parity, so local smooth functions are formal power series. On the other hand, a full version of differential calculus is still valid. We show in this paper that the fundamental properties of classical principal bundles can be generalised to the setting of this `higher graded' geometry, with properly defined frame bundles of Z2n-vector bundles as canonical examples. However, formulating these concepts and proving these results relies on many technical upshots established in earlier papers. A comprehensive introduction to Z2n-manifolds is therefore included together with basic examples.

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