Z2n-Supergeometry I: Manifolds and Morphisms

Abstract

In Physics and in Mathematics Z2n-gradings, n ≥ 2, do appear quite frequently. The corresponding sign rules are determined by the `scalar product' of the involved Z2n-degrees. The present paper is the first of a series on Z2n-Supergeometry. The new theory exhibits challenging differences with the classical one: nonzero degree even coordinates are not nilpotent, and even (resp., odd) coordinates do not necessarily commute (resp., anticommute) pairwise (the parity is the parity of the total degree). It is based on the hierarchy: ` Z20-Supergeometry (classical differential Geometry) contains the germ of Z21-Supergeometry (standard Supergeometry), which in turn contains the sprout of Z22-Supergeometry, etc.' The Z2n-supergeometric viewpoint provides deeper insight and simplified solutions; interesting relations with Quantum Field Theory and Quantum Mechanics are expected. In this article, we define Z2n-supermanifolds and provide examples in the atlas, the ringed space and coordinate settings. We thus show that formal series are the appropriate substitute for nilpotency. Moreover, the category of Z2n-supermanifolds is closed with respect to the tangent and cotangent functors. The fundamental theorem describing supermorphisms in terms of coordinates is extended to the Z2n-context.