Average values of modular L-series via the relative trace formula
Abstract
First we reprove, using representation theory and the relative trace formula of Jacquet, an average value result of Duke for modular L-series at the critical center. We also establish a refinement. To be precise, the L-value which appears is L(1/2, f)L(1/2,f,) (divided by the Petersson norm of f), and the average is over newforms f of prime level N and coefficients ap(f), with being an odd quadratic Dirichlet character of conductor -D and associated quadratic field K. For any prime p not dividing ND, the asymptotic as N goes to infinity is governed by a measure μp, which is the Plancherel measure at p when (p)=-1, but is new if (p)=1; as p goes to infinity both measures approach the Sato-Tate measure. A particular consequence of our refinement is that for any non-empty interval J in [-2,2], there are infinitely many primes N, which are inert in K, such that for some f of level N, ap(f) is in J and L(1/2, f)L(1/2,f,) is non-zero.
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