Stability of direct images under Frobenius morphism
Abstract
Let X be a smooth projective variety over an algebraically field k with char(k)=p>0 and F:X X1 be the relative Frobenius morphism. When dim(X)=1, we prove that F*W is a stable bundle for any stable bundle W (Theorem thm1.3). As a step to study the question for higher dimensional X, we generalize the canonical filtration (defined by Joshi-Ramanan-Xia-Yu for curves) to higher dimensional X (Theorem thm2.6).
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