Splitting vector bundles over real algebraic varieties

Abstract

Suppose X is a smooth affine real variety and E is a vector bundle over X. We analyze the problem of splitting off a free rank one summand from E in corank 0 and 1. The problem in corank 0 can be viewed as the search for a real analog of Murthy's celebrating splitting theorem in the algebraically closed case: to wit, beyond the vanishing of the top Chern class in Chow theory, are the obstructions to splitting ``purely topological''? In a sense, the answer in this case is yes, and we give a proof, using motivic techniques, of a mild extension of the results of Bhatwadekar-Sridharan and Bhatwadekar-Das-Mandal. In corank 1, in the algebraically closed situation, Murthy's splitting conjecture (now a theorem in characteristic 0) predicts that the vanishing of the top Chern class in Chow theory is the only obstruction to splitting off a free rank 1 summand, and we can search for a suitable ``real'' analog of this assertion. We observe that several natural guesses for a ``real'' analog of Murthy's splitting conjecture cannot be true, i.e., that the situation over the real numbers is rather complicated.

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