Crouching AGM, Hidden Modularity

Abstract

Special arithmetic series f(x)=Σn=0∞cnxn, whose coefficients cn are normally given as certain binomial sums, satisfy "self-replicating" functional identities. For example, the equation 1(1+4z)2f(z(1+4z)3)=1(1+2z)2f(z2(1+2z)3) generates a modular form f(x) of weight 2 and level 7, when a related modular parametrization x=x(τ) is properly chosen. In this note we investigate the potential of describing modular forms by such self-replicating equations as well as applications of the equations that do not make use of the modularity. In particular, we outline a new recipe of generating AGM-type algorithms for computing π and other related constants. Finally, we indicate some possibilities to extend the functional equations to a two-variable setting.