Towards the finite slope part for GLn

Abstract

Let L be a finite extension of Qp and n≥ 2. We associate to a crystabelline n-dimensional representation of Gal( L/L) satisfying mild genericity assumptions a finite length locally Qp-analytic representation of GLn(L). In the crystalline case and in a global context, using the recent results on the locally analytic socle from [BHS17a] we prove that this representation indeed occurs in spaces of p-adic automorphic forms. We then use this latter result in the ordinary case to show that certain "ordinary" p-adic Banach space representations constructed in our previous work appear in spaces of p-adic automorphic forms. This gives strong new evidence to our previous conjecture in the p-adic case.