The lambda invariants at CM points

Abstract

In the paper, we show that λ(z1) -λ(z2), λ(z1) and 1-λ(z1) are all Borcherds products in X(2) × X(2). We then use the big CM value formula of Bruinier, Kudla, and Yang to give explicit factorization formulas for the norms of λ(d+ d2), 1-λ(d+ d2), and λ(d1+d12) -λ(d2+d22), with the latter under the condition (d1, d2)=1. Finally, we use these results to show that λ(d+ d2) is always an algebraic integer and can be easily used to construct units in the ray class field of Q(d) of modulus 2. In the process, we also give explicit formulas for a whole family of local Whittaker functions, which are of independent interest.