Nonexistence of exceptional bundles on $\mathbb{P}^{3}$ with maximal possible ranks

Yeqin Liu

Nonexistence of exceptional bundles on P3 with maximal possible ranks

Abstract

We prove that on P3 there is no exceptional bundle with rank r=2d2+1 and degree d for every |d|≥ 4. In particular, we find a new obstruction for the existence of exceptional bundles other than r|(2d2+1). We also show that there is no exceptional bundle with rank 27 and degree 11 to exhibit another different obstruction.

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