On the integrality of modular functions over Z[j] and Kronecker-type congruences
Abstract
Let N be a positive integer and let f be a meromorphic modular function of level N with rational Fourier coefficients. For a prime p, define a function fp on the complex upper half-plane H by equation* fp(τ)=f(τp)(τ∈H). equation* Let j be the elliptic modular function. We show that if p 1 or -1N and f is integral over Z[j], then equation* 1p(fpp-f)(fp-fp) equation* is also integral over Z[j]. This result generalizes the classical Kronecker congruence relation for j.
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