Tautological algebra of the moduli stack of semistable bundles of rank 2 on a general curve

Abstract

Our aim is to determine the tautological algebra generated by the cohomology classes of the Brill-Noether loci in the rational cohomology of the moduli stack UC(n,d) of semistable bundles of rank n and degree d. We show that for a general smooth projective curve C of genus g≥ 2, d=2g-2, the tautological algebra of UC(2,2g-2) (resp. the moduli stack SUC(2,L) of semistable bundles of rank 2 and determinant L with (L)=2g-2) is generated by the divisor classes (resp. the class of the Theta divisor ). This is previously known in rank one situation, called the (classical) Porteous formula.