The non-abelian Leopoldt conjecture and equalities of L-invariants
Abstract
Let G be a reductive group quasi-split at p. Using arguments of Hansen--Thorne, we show that under the non-abelian Leopoldt conjecture (NALC), Hansen's p-adic overconvergent cohomology eigenvariety for G is \'etale over its image in weight space at any non-critical classical tempered cuspidal point of `cohomological multiplicity one'. This applies to all non-critical classical cuspidal points if G = ResF/QGLn. We then let π be a p-ordinary regular algebraic cuspidal automorphic representation of GLn(AQ) such that πp is Steinberg. Combining the above \'etaleness result for the classical point attached to π, and a local-global compatibility result from our earlier work, we deduce -- under a tangent vector hypothesis that is true for at least half the simple roots -- the equality of Fontaine--Mazur and automorphic L-invariants for π. Where this assumption is satisfied, we deduce the NALC implies a conjecture of Gehrmann: that automorphic L-invariants are independent of cohomological degree. Our approach is inspired by (and generalises) previous work of Gehrmann--Rosso. When π = Symn-1 πf is the symmetric power lift of a modular form, we verify all assumptions other than the NALC, and deduce a functoriality result for the automorphic L-invariants.
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