Local newforms and formal exterior square L-functions

Details Local newforms and formal exterior square L-functions Local newforms and formal exterior square L-functions

2012-03-30

arxiv.org/abs/1203.6841v1

Mathematics

Number Theory

12 pages

Scientific paper

Let F be a non-archimedean local field of characteristic zero. Jacquet and Shalika attached a family of zeta integrals to unitary irreducible generic representations $\pi$ of GL_n(F). In this paper, we show that Jacquet-Shalika integral attains a certain L-function, so called the formal exterior square L-function, when the Whittaker function is associated to a newform for $\pi$. By consideration on the Galois side, formal exterior square L-functions are equal to exterior square L-functions for some principal series representations.

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