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Restriction of stable bundles in characteristic

Authors:	Tohru Nakashima

Institution:	Department of Mathematics, Tokyo Metropolitan University, Minami-Ohsawa 1-1, Hachioji-shi, Tokyo, 192-03 Japan

Abstract:	Let be an algebraically closed field of characteristic . Let be a nonsingular projective variety defined over and an ample line bundle on . We shall prove that there exists an explicit number $m_{0}$ such that if is a $\mu$ -stable vector bundle of rank at most three, then the restriction $E_{\vert D}$ is $\mu$ -stable for all $m\geq m_{0}$ and all smooth irreducible divisors $D\in \vert mH\vert$ . This result has implications to the geometry of the moduli space of $\mu$ -stable bundles on a surface or a projective space.

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