An explicit height bound for the classical modular polynomial

A. Enge; Andrew V. Sutherland; D. Charles; D.R. Anderson; G.H. Hardy; H. Cohen; H. Robbins; N. Brisebarre; O. Hölder; P. Cohen; P.T. Bateman; R.L. Graham; Reinier Bröker; S. Lang; T.M. Apostol; T.M. Apostol

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An explicit height bound for the classical modular polynomial

Authors: A. Enge
Andrew V. Sutherland
D. Charles
D.R. Anderson
G.H. Hardy
H. Cohen
H. Robbins
N. Brisebarre
O. Hölder
P. Cohen
P.T. Bateman
R.L. Graham
Reinier Bröker
S. Lang
T.M. Apostol
T.M. Apostol
Publication date: 10 April 2010
Publisher: 'Springer Science and Business Media LLC'
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Abstract

For a prime m, let Phi_m be the classical modular polynomial, and let h(Phi_m) denote its logarithmic height. By specializing a theorem of Cohen, we prove that h(Phi_m) <= 6 m log m + 16 m + 14 sqrt m log m. As a corollary, we find that h(Phi_m) <= 6 m log m + 18 m also holds. A table of h(Phi_m) values is provided for m <= 3607.Comment: Minor correction to the constants in Theorem 1 and Corollary 9. To appear in the Ramanujan Journal. 17 pages

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