On a Conjecture of Drinfeld
Abstract
Let C be a smooth irreducible irreducible projective curve of genus g 2. Let MC(n, δ) be the moduli space of semi-stable vector bundles on C of rank n and fixed determinant δ of degree d. Then the locus of wobbly bundles is known to be closed in MC(n, δ). It was announced by Laumon and attributed to Drinfeld that the wobbly locus is pure of co-dimension one, i.e., they form a divisor in MC(n, δ). This is now known as Drinfeld's conjecture. In this article, we will give a proof of the conjecture when n and d are coprime.
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