Stability of the Parabolic Picard Sheaf
Abstract
Let X be a smooth irreducible complex projective curve of genus g\,≥\, 2, and let D\,=\,x1+…+xr be a reduced effective divisor on X. Denote by Uα(L) the moduli space of stable parabolic vector bundles on X of rank n, determinant L of degree d with flag type \\kij\j=1mi\i=1r. Assume that the greatest common divisor of the collection of integers \degree(L),\, \\kij\j=1mi\i=1r\ is 1; this condition ensures that there is a Poincar\'e parabolic vector bundle on X× Uα(L). The direct image, to Uα(L), of the vector bundle underlying the Poincar\'e parabolic vector bundle is called the parabolic Picard sheaf. We prove that the parabolic Picard sheaf is stable.
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