∞-Categorical Generalized Langlands Program I: Mixed-Parity Modules and Sheaves

Abstract

Mixed-parity module emerges for instance when a de Rham Galois representation is being tensored with a square root of cyclotomic character, which produces half odd integers as the corresponding Hodge-Tate weights. We build the whole foundation on the p-adic Hodge theory in this setting over small v-stacks after Scholze and we also consider certain moduli v-stack which parametrizes families of mixed-parity Hodge modules. Examples of the small v-stacks in our mind are rigid analytic spaces over p-adic fields and moduli v-stack of vector bundles over Fargues-Fontaine curves. The preparation implemented at this level will be expected to provide further essential foundationalization for generalized Langlands program after Langlands, Drinfeld, Fargues-Scholze. One side of the generalized Langlands correspondence in the geometric setting is the perverse motivic derived ∞-category over ModuliG related to smooth representations of reductive groups, while the other side of the generalized Langlands correspondence in the geometric setting is the corresponding derived ∞-category over the stack of mixed-parity L-parametrizations (i.e. from two-fold covering of the Weil group into -adic groups) related to the representations of Weil group in our setting into Langlands dual groups. Although after Scholze and Fargues-Scholze our generalized Langlands program can go along -adic cohomologicalization to immediately achieve various solid derived ∞-categories DerCat\'et(ModuliG,), DerCatlisse, (ModuliG,), DerCat(ModuliG,) and so on with well-established formalism regarding 6-functors, we already provide certain p-adic cohomologicalization of the story over ModuliG.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…