Special Values of Motivic L-Functions and Zeta-Polynomials for Symmetric Powers of Elliptic Curves

Abstract

Let M be a pure motive over Q of odd weight w≥ 3, even rank d≥ 2, and global conductor N whose L-function L(s,M) coincides with the L-function of a self-dual algebraic tempered cuspidal symplectic representation of GLd(AQ). We show that a certain polynomial which generates special values of L(s,M) (including all of the critical values) has all of its zeros equidistributed on the unit circle, provided that N or w are sufficiently large with respect to d. These special values have arithmetic significance in the context of the Bloch-Kato conjecture. We focus on applications to symmetric powers of semistable elliptic curves over Q. Using the Rodriguez-Villegas transform, we use these results to construct large classes of "zeta-polynomials" (in the sense of Manin) arising from symmetric powers of semistable elliptic curves; these polynomials have a functional equation relating s 1-s, and all of their zeros on the line Re(s)=1/2.