Computing the local 2-component of a non-selfdual automorphic representation of GL3
Abstract
In this paper, we explicitly determine the local 2-adic component of a non-selfdual automorphic representation of GL3 constructed by van Geemen and Top. We prove that 2 is a parabolically induced representation of GL3(Q2) given by 2 = IndPGL3(Q2)(π ), where P is the standard parabolic subgroup of GL3 with Levi subgroup GL2 × GL1, is an unramified character of Q2× satisfying (2) = -2-1, and π is a supercuspidal representation of GL2(Q2). Furthermore, we describe π explicitly as a compactly induced representation π = c-IndJαGL2(Q2) and determine the representation explicitly. The proof relies on explicit computations of Hecke eigenvalues using computer calculations. The automorphic representation is realized in the cuspidal cohomology of the congruence subgroup 0(128) ⊂ SL3(Z). By computing the Hecke eigenvalues of an associated Hecke eigenvector, we are able to uniquely identify the local structure of 2. As an application, we obtain an explicit description of the 2-adic local component of the Galois representation vGT, associated with .
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