Schwartz -densities for the moduli stack of rank 2 bundles on a curve over a local field
Abstract
Let Bun be the moduli stack of rank 2 bundles with fixed determinant on a smooth proper curve C over a local field F. We show how to associate with a Schwartz -density, for Re() 1/2, a smooth function on the corresponding coarse moduli space of very stable bundles. In the non-archimedean case we also prove that the stack Bun is -bounded in the sense of Definition 2.10 of [arXiv:2112.08139] for any ∈C.
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