Parabolic Simple L-Invariants
Abstract
Let L be a finite extension of Qp. Let L be a potentially semi-stable non-crystalline p-adic Galois representation such that the associated F-semisimple Weil-Deligne representation is absolutely indecomposable. In this paper, we study Fontaine-Mazur parabolic simple L-invariants of L, which was previously only known in the trianguline case. Based on the previous work on Breuil's parabolic simple L-invariants, we attach to L a locally Qp-analytic representation (L) of GLn(L), which carries the information of parabolic simple L-invariants of L. When L comes from a patched automorphic representation of G(AF+) (for a define unitary group G over a totally real field F+ which is compact at infinite places and GLn at p-adic places), we prove under mild hypothesis that (L) is a subrepresentation of the associated Hecke-isotypic subspace of the Banach spaces of (patched) p-adic automophic forms on G(AF+), this is equivalent to say that the Breuil's parabolic simple L-invariants are equal to Fontaine-Mazur parabolic simple L-invariants.
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.