Homotopy Classification of Super Vector Bundles and Universality

Abstract

This study first provides a brief overview of the structure of typical Grassmann manifolds. Then a new type of supergrassmannians is construced using an odd involution in a super ringed space and by gluing superdomains together. Next, constructing a Gauss morphism of a super vector bundle, some properties of this morphism is discussed. By this, we generalize one of the main theorems of homotopy classification for vector bundles in supergeometry. Afterwards, a similar structure is introduced in the state of infinite-dimensional. Here our tools mainly include multilinear algebra of Grassmann algebras, the direct limit of the base spaces and the inverse limit of the structure sheaf of ringed spaces. We show that the resulting super vector bundle is a universal member of its category.