Equations involving the modular j-function and its derivatives

Abstract

We show that for any polynomial F(X,Y0,Y1,Y2) ∈ C[X, Y0, Y1, Y2], the equation F(z,j(z),j'(z),j''(z))=0 has a Zariski dense set of solutions in the hypersurface F(X,Y0,Y1,Y2)=0, unless F is in C[X] or it is divisible by Y0, Y0-1728, or Y1. Our methods establish criteria for finding solutions to more general equations involving periodic functions. Furthermore, they produce a qualitative description of the distribution of these solutions.

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