Dilogarithm and higher L-invariants for GL3(Qp)

Abstract

Let E be a sufficiently large finite extension of Qp and p be a semi-stable representation Gal(Qp/Qp)→GL3(E) with a rank two monodromy operator N and a non-critical Hodge filtration. We know that p has three L-invariants. We construct a family of locally analytic representations of GL3(Qp) depending on three invariants in E with each of them containing the locally algebraic representation determined by p. When p comes from an automorphic representation π of G(AQp) for a suitable unitary group G/Q, we show that there is a unique object in the above family that embeds into the associated Hecke-isotypic subspace in the completed cohomology. We recall that Breuil constructed a family of locally analytic representations depending on four invariants and proved a similar result of local-global compatibility. We prove that if a representation in Breuil's family embeds into the completed cohomology, then it must equally embed into an object in our family determined by . This gives a purely representation theoretic necessary condition for to embed into completed cohomology. Moreover, certain natural subquotients of each object in our family give a true complex of locally analytic representations that realizes the derived object (λ, L) by Schraen for a unique L determined by the object. Consequently, the family we construct gives a relation between the higher L-invariants studied by Breuil and Ding and the p-adic dilogarithm function which appears in the construction of (λ, L) by Schraen.