P. Edward Herman
Published 2010-08-23, updated 2014-07-25Version 5
Using Langlands's {\it Beyond Endoscopy} idea and analytic number theory techniques, we study the Asai L-function associated to a real quadratic field $\mathbf{K}/\Q.$ If the Asai L-function associated to an automorphic form over $\mathbf{K}$ has a pole, then the form is a base change from $\Q$. We prove this and further prove the analytic continuation of the L-function. This is one of the first examples of using a trace formula to get such information. A hope of Langlands is that general L-functions can be studied via this method.
Comments: 44 pages. Submitted. Significant revision, especially Section 10. arXiv admin note: text overlap with arXiv:math/0202189 by other authors
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