Arithmetic Hirzebruch-Zagier divisors and central derivative values of Rankin-Selberg L-functions

Abstract

Let E be an elliptic curve parametrized by a newform ϕ∈ S2(Γ0(N)). Let k be a quadratic field of discriminant dk prime to N. Given a character χ of the ideal class group of k with theta series θ(χ), we relate the central derivative values Λ'(E/k, χ, 1) = Λ'(1/2, ϕ× θ(χ)) of the χ-twisted L-function of E/k to arithmetic heights of Hirzebruch-Zagier divisors on X0(N)× X0(N) when k is imaginary quadratic, and to sums of Green's functions of Hirzebruch-Zagier divisors along real geodesic cycles of X0(N) × X0(N) determined by ideal classes when k is real quadratic. More generally, we refine the higher Gross-Zagier formulae for CM cycles on spin Shimura varieties of any dimension this way. This gives two arithmetic height formulae for Λ'(E/k, χ, 1) when k is imaginary quadratic, as well as a distinct proof of the Gross-Zagier formula, with implied relations between the arithmetic heights of Heegner divisors on X0(N) and Hirzebruch-Zagier divisors on X0(N) × X0(N). We also explain connections to the refined conjecture of Birch-Swinnerton-Dyer, and to Fourier coefficients of half-integral weight forms.