Functorial products for GL2× GL3 and the symmetric cube for GL2
Abstract
In this paper we prove two new cases of Langlands functoriality. The first is a functorial product for cusp forms on GL2× GL3 as automorphic forms on GL6, from which we obtain our second case, the long awaited functorial symmetric cube map for cusp forms on GL2. We prove these by applying a recent version of converse theorems of Cogdell and Piatetski-Shapiro to analytic properties of certain L-functions obtained from the method of Eisenstein series (Langlands-Shahidi method). As a consequence, we prove the bound 5/34 for Hecke eigenvalues of Maass forms over any number field and at every place, finite or infinite, breaking the crucial bound 1/6 (see below and Section 7 and 8) towards Ramanujan-Petersson and Selberg conjectures for GL2. Many other applications are obtained.
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