Abstract
Let $E$ be a principal $G$--bundle over a smooth projective curve over an algebraically closed field $k$, where $G$ is a reductive linear algebraic group over $k$. We construct a canonical reduction of $E$. The uniqueness of canonical reduction is proved under the assumption that the characteristic of $k$ is zero. Under a mild assumption on the characteristic, the uniqueness is also proved when the characteristic of $k$ is positive.
Citation
Indranil Biswas. Yogish I. Holla. "Harder-Narasimhan reduction of a principal bundle." Nagoya Math. J. 174 201 - 223, 2004.
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