Stability of sheaves of locally closed and exact forms

Abstract

For any smooth projective variety X of dimension n over an algebraically closed field k of characteristic p>0 with μ(1X)>0. If T(1X) (0<<n(p-1)) are semi-stable, then the sheaf B1X of exact 1-forms is stable. When X is a surface with μ(1X)>0 and 1X is semi-stable, the sheaf B2X of exact 2-forms is also stable. Moreover, under the same condition, the sheaf Z1X of closed 1-forms is stable when p>3, and Z1X is semi-stable when p=3.