Nondefinability results for elliptic and modular functions

Abstract

Let be a complex lattice which does not have complex multiplication and = the Weierstrass -function associated to it. Let D⊂eqC be a disc and I⊂eqR be a bounded closed interval such that I=. Let f:D→C be a function definable in (R,|I). We show that if f is holomorphic on D then f is definable in R. The proof of this result is an adaptation of the proof of Bianconi for the R case. We also give a characterization of lattices with complex multiplication in terms of definability and a nondefinability result for the modular j-function using similar methods.