Moduli stacks of quiver connections and non-Abelian Hodge theory
Abstract
In arXiv:2407.11958, a moduli stack parametrizing I--indexed diagrams of Higgs bundles over a base stack X was constructed for any finite simplicial set I, inspiring speculations about extending the non-Abelian Hodge correspondence to these moduli stacks. In the present work, we formalize the de Rham side of this conjectural extension. We construct moduli stacks parametrizing diagrams of bundles with λ--connections over a base prestack X, where λ can be a fixed number or a parameter. Taking λ to be 1 gives a moduli stack parametrizing diagrams of bundles with connection, while taking it to be a parameter gives a version of Simpson's non-Abelian Hodge filtration for digrams of bundles with connection. We show that when X is a smooth and projective scheme over an algebraically closed field k of characteristic 0, these moduli stacks are algebraic and locally of finite presentation, and have affine diagonal.
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