Counting maximal Lagrangian subbundles over an algebraic curve
Abstract
Let C be a smooth projective curve and W a symplectic bundle over C. Let LQe (W) be the Lagrangian Quot scheme parametrizing Lagrangian subsheaves E ⊂ W of degree e. We give a closed formula for intersection numbers on LQe (W). As a special case, for g 2, we compute the number of Lagrangian subbundles of maximal degree of a general stable symplectic bundle, when this is finite. This is a symplectic analogue of Holla's enumeration of maximal subbundles in [13].
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