The cubic Pell equation L-function

Abstract

For d > 1 a cubefree rational integer, we define an L-function (denoted Ld(s)) whose coefficients are derived from the cubic theta function for Q(-3). The Dirichlet series defining Ld(s) converges for Re(s) > 1, and its coefficients vanish except at values corresponding to integral solutions of mx3 - dny3 = 1 in Q(-3), where m and n are squarefree. By generalizing the methods used to prove the Takhtajan-Vinogradov trace formula, we obtain the meromorphic continuation of Ld(s) to Re(s) > 12 and prove that away from its poles, it satisfies the bound Ld(s) |s|72 and has a possible simple pole at s = 23, possible poles at the zeros of a certain Appell hypergeometric function, with no other poles. We conjecture that the latter case does not occur, so that Ld(s) has no other poles with Re(s) > 12 besides the possible simple pole at s = 23.