On the stability of pulled back parabolic vector bundles

Abstract

Take an irreducible smooth projective curve X defined over an algebraically closed field of characteristic zero, and fix finitely many distinct point D\, =\, \x1,\, ·s,\, xn\ of it; for each point x\, ∈\, D fix a positive integer Nx. Take a nonconstant map f\, :\, Y\, \, X from an irreducible smooth projective curve. We construct a natural subbundle F\, ⊂\, f* OY using (D,\, \Nx\x∈ D). Let E* be a stable parabolic vector bundle whose parabolic weights at each x\, ∈\, D are integral multiples of 1Nx. We prove that the pullback f*E* is also parabolic stable, if rank(F)\,=\, 1.