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In algebraic geometry, given a smooth projective curve X over a finite field and a smooth affine group scheme G over it, the moduli stack of principal bundles over X, denoted by , is an algebraic stack given by: for any -algebra R, the category of principal G-bundles over the relative curve . In particular, the category of -points of , that is, , is the category of G-bundles over X. In the finite field case, it is not common to define the homotopy type of . But one can still define a (smooth) cohomology and homology of .
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