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YCor
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kindasorta
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Why is the weight monodromy hard in mixed characteristics?

I know very little about the conjecture, beyond Grothendieck's monodromy theorem perhaps (a dense open subgroup of inertia acting unipotently on pure motives). But I heard that it was completely solved in characteristic $p$, and using Scholze's perfectoid spaces, also for hypersurfaces of toric varieties.

What is it about pure $\mathbb{Q}_p$-motives that makes the conjecture that much harder?