Companion points and locally analytic socle for GL2(L)
Abstract
Let p>2 be a prime number, and L be a finite extension of Qp, we prove Breuil's locally analytic socle conjecture for GL2(L), showing the existence of all the companion points on the definite (patched) eigenvariety. This work relies on infinitesimal "R=T" results for the patched eigenvariety and the comparison of (partially) de Rham families and (partially) Hodge-Tate families. This method allows in particular to find companion points of non-classical points.
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