Instability of Truncated Symmetric Powers of sheaves

Abstract

Let X be a smooth projective variety of dimension n over an algebraically closed field k of characteristic p>0. Let FX:X→ X be the absolute Frobenius morphism, and a torsion free sheaf on X. We give a upper bound of instability of truncated symmetric powers Tl()(0≤ l≤()(p-1)) in terms of L(1X), I(1X) and I() (Theorem InstabTl). As an application, We obtain a upper bound of Frobenius direct image FX*() and some sufficient conditions of slope semi-stability of FX*(). In addition, we study the slope (semi)-stability of sheaves of locally exact (closed) forms BiX (ZiX).