Nahid Walji
Published 2013-08-07Version 1
Let \Pi\ be a cuspidal automorphic representation for GL(4) over a number field F. We obtain unconditional lower bounds on the number of places at which the Satake parameters are not "too large". In the case of self-dual \Pi\ with non-trivial central character, our results imply that the set of places at which \Pi\ is tempered has an explicit positive lower Dirichlet density. Our methods extend those of Ramakrishnan by careful analysis of the hypothetical possibilities for the structure of the Langlands conjugacy classes, as well as their behaviour under functorial lifts. We then discuss the analogous problem in GL(3).
Comments: 15 pages
Journal: Journal of Number Theory, Volume 133, Issue 10, October 2013, Pages 3470-3484
Quotients of $L$-functions: degrees $n$ and $n-2$
Plancherel distribution of Satake parameters of Maass cusp forms on $GL_3$
A semisimple mod $p$ Langlands correspondence in families for $GL_2(\mathbb{Q}_p)$
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