Transport of Zariski density in compatible collections of G-representations
Abstract
Let X be a connected normal scheme of finite type over Z, let G be a connected reductive group over Q, and let \π1(X[1/]) G(Q)\ be a Frobenius-compatible collection of continuous homomorphisms indexed by the primes. Assume Img() is Zariski-dense in GQ for all in a nonempty finite set R. We prove that, under certain hypotheses on R (depending only on G), Img() is Zariski-dense in GQ for all in a set of Dirichlet density 1. As an application, we combine this result with a version of Hilbert's irreducibility theorem and recent work of Klevdal--Patrikis to obtain new information about the "canonical" local systems attached to Shimura varieties not of Abelian type.
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