Reconstructing vector bundles on curves from their direct image on symmetric powers

Abstract

Let C be an irreducible smooth complex projective curve, and let E be an algebraic vector bundle of rank r on C. Associated to E, there are vector bundles Fn(E) of rank nr on Sn(C), where Sn(C) is n-th symmetric power of C. We prove the following: Let E1 and E2 be two semistable vector bundles on C, with genus(C)\, ≥\, 2. If Fn(E1)\,= \, Fn(E2) for a fixed n, then E1 \,=\, E2$.