Grassmann sheaves and the classification of vector sheaves

Abstract

Given a sheaf of unital commutative and associative algebras A, first we construct the k-th Grassmann sheaf GA(k,n) of An whose sections induce vector subsheaves of An of rank k. Next we show that every vector sheaf over a paracompact space is a subsheaf of A∞. Finally, applying the preceding results to the universal Grassmann sheaf GA(n), we prove that vector sheaves of rank n over a paracompact space are classified by the global sections of GA(n).