Finitude des couples d'invariants modulaires singuliers sur une courbe algébrique plane non modulaire

Abstract

Abstract Let S be an irreducible algebraic curve in the affine complex plane. Assume that S is neither a horizontal Une, nor a vertical line, nor a modular curve Y0(N) (for any integer N ≧ 1). Then there are only finitely many points P of S such that both coordinates of P are singular moduli (i.e. invariants of elliptic curves with complex multiplication).