A stratification of the moduli space of vector bundles on curves
Abstract
Let E be a vector bundle of rank r≥ 2 on a smooth projective curve C of genus g ≥ 2 over an algebraically closed field K of arbitrary characteristic. For any integer with 1 k r-1 we define k(E):=k E-r F. where the maximum is taken over all subbundles F of rank k of E. The sk gives a stratification of the moduli space M(r,d) of stable vector bundles of rank r and degree on d on C into locally closed subsets (r,d,k,s) according to the value of s and k. There is a component M0(r,d,k,s) of M(r,d,k,s) distinguish by the fact that a general E∈ M0(r,d,k,s) admits a stable subbundle F such that E/F is also stable. We prove: For g r+12 and 0<s≤ k(r-k)(g-1) +(r+1), s kd r, M0(r,d,k,s) is non-empty,and its component M0(r,d,k,s) is of dimension M0(r,d,k,s)=\arraylcl (r2+k2-rk)(g-1)+s-1& &s<k(r-k)(g-1) & if& r2(g-1)+1& & s k(r-k)(g-1)array.
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