Efficient generation of projective modules: a motivic view

Abstract

Assume k is a field and R is a smooth k-algebra of dimension d. If P is a projective module of rank r, then it is well-known that P can be generated by r+d-elements (Forster--Swan). Under suitable assumptions on r and d, we investigate obstructions to generation of P by fewer than r+d elements using motivic homotopy theory. For example, we observe that a quadratic enhancement of the classical Segre class obstructs generation by r+d-1 elements, whether or not k is algebraically closed, generalizing old results of M.P. Murthy. Along the way, we also establish efficient generation results for symplectic modules.

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