Abstract
AbstractThe Hilbert class polynomial has as roots the j-invariants of elliptic curves whose endomorphism ring is a given imaginary quadratic order. It can be used to compute elliptic curves over finite fields with a prescribed number of points. Since its coefficients are typically rather large, there has been continued interest in finding alternative modular functions whose corresponding class polynomials are smaller. Best known are Weber’s functions, which reduce the size by a factor of 72 for a positive density subset of imaginary quadratic discriminants. On the other hand, Bröker and Stevenhagen showed that no modular function will ever do better than a factor of 100.83. We introduce a generalization of class polynomials, with reduction factors that are not limited by the Bröker–Stevenhagen bound. We provide examples matching Weber’s reduction factor. For an infinite family of discriminants, their reduction factors surpass those of all previously known modular functions by a factor at least 2.
Funder
Fonds Wetenschappelijk Onderzoek
Publisher
Springer Science and Business Media LLC
Subject
Algebra and Number Theory
Reference37 articles.
1. Bars, F.: Bielliptic modular curves. J. Number Theory 76(1), 154–165 (1999)
2. Birch, B.J.: Weber’s class invariants. Mathematika 16, 283–294 (1969)
3. Bröker, R., Lauter, K., Sutherland, A.V.: Modular polynomials via isogeny volcanoes. Math. Comput. 81(278), 1201–1231 (2012)
4. Bröker, R., Stevenhagen, P.: Constructing elliptic curves of prime order. In: Computational Arithmetic Geometry. Contemporary Mathematics, vol. 463, pp. 17–28. American Mathematical Society, Providence, RI (2008)
5. Cremona, J.: Algorithms for Modular Elliptic Curves. Cambridge University Press, Cambridge (1992)