The double Ringel-Hall algebra on a hereditary abelian finitary length category
Abstract
In this paper, we study the category H() of semi-stable coherent sheaves of a fixed slope over a weighted projective curve. This category has nice properties: it is a hereditary abelian finitary length category. We will define the Ringel-Hall algebra of H() and relate it to generalized Kac-Moody Lie algebras. Finally we obtain the Kac type theorem to describe the indecomposable objects in this category, i.e. the indecomposable semi-stable sheaves.
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