An explicit height bound for the classical modular polynomial

Abstract

For a prime m, let Phim be the classical modular polynomial, and let h(Phim) denote its logarithmic height. By specializing a theorem of Cohen, we prove that h(Phim) <= 6 m log m + 16 m + 14 sqrt m log m. As a corollary, we find that h(Phim) <= 6 m log m + 18 m also holds. A table of h(Phim) values is provided for m <= 3607.