Compact Generation of the Category of D-Modules on the Stack of G-Bundles on a Curve
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Drinfeld, Vladimir, and Dennis Gaitsgory. 2013. Compact generation of the category of D-modules on the stack of G-bundles on a curve. Working paper.Abstract
The goal of the paper is to show that the (derived) category of D-modules on the stack \(Bun_G(X)\) is compactly generated. Here X is a smooth complete curve, and G is a reductive group. The problem is that \(Bun_G(X)\) is not quasi-compact, so the above compact generation is not automatic. The proof is based on the following observation: \(Bun_G(X)\) can be written as a union of quasi-compact open substacks, which are "co-truncative", i.e., the \(j_!\) extension functor is defined on the entire category of D-modules.Other Sources
http://arxiv.org/abs/1112.2402http://www.math.harvard.edu/~gaitsgde/GL/Dmod(BunG).pdf
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