Local model of Hilbert-Siegel moduli schemes in 1(p)-level
Abstract
We construct a local model for Hilbert-Siegel moduli schemes with 1(p)-level bad reduction over Spec Zq, where p is a prime unramified in the totally real field and q is the residue cardinality over p. Our main tool is a variant over the small Zariski site of the ring-equivariant Lie complex AG defined by Illusie in his thesis, where A is a commutative ring and G is a scheme of A-modules. We use it to calculate the Fq-equivariant Lie complex of a Raynaud group scheme, then relate the integral model and the local model.
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