关于纳姆方程的注解

Proceedings of Symposia in Pure Mathematics Pub Date : 2017-08-29 DOI:10.1090/pspum/099/01738

N. Hitchin

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引用次数: 4

摘要

纳姆方程在更一般的情况下被看作是在投影线上的共希格斯束的模空间上的向量场。这个向量场的零点对应于奇异谱曲线上的无扭束，我们将其转换成三维射影空间中的光滑曲线。我们还说明了谱曲线非约化时如何需要Nahm方程的推广，并推导出在这种情况下非经典守恒量的存在性。

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Remarks on Nahm’s equations

Nahm's equations are viewed in a more general context where they appear as a vector field on a moduli space of co-Higgs bundles on the projective line. Zeros of this vector field correspond to torsion-free sheaves on a singular spectral curve which we translate in terms of a smooth curve in three-dimensional projective space. We also show how generalizations of Nahm's equations are required when the spectral curve is non-reduced and deduce the existence of non-classical conserved quantities in this situation.

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