Generalised Weber functions

Andreas Enge; Franc¸ois Morain

doi:10.4064/aa164-4-1

Generalised Weber functions

Andreas Enge
, Franc¸ois Morain

Univ. Bordeaux

Research output: Contribution to journal › Article › peer-review

Abstract

A generalised Weber function is given by w_N(z) - η(z/N)/η(z), where η(z) is the Dedekind function and N is any integer; the original function corresponds to N=2. We classify the cases where some power w_N^e evaluated at some quadratic integer generates the ring class field associated to an order of an imaginary quadratic field. We compare the heights of our invariants by giving a general formula for the degree of the modular equation relating w_N(z) and j(z). Our ultimate goal is the use of these invariants in constructing reductions of elliptic curves over finite fields suitable for cryptographic use.

Original language	English
Pages (from-to)	309-341
Number of pages	33
Journal	Acta Arithmetica
Volume	164
Issue number	4
DOIs	https://doi.org/10.4064/aa164-4-1
Publication status	Published - 1 Jan 2014

Keywords

Class invariants
Complex multiplication
Eta quotients

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AB - A generalised Weber function is given by wN(z) - η(z/N)/η(z), where η(z) is the Dedekind function and N is any integer; the original function corresponds to N=2. We classify the cases where some power wNe evaluated at some quadratic integer generates the ring class field associated to an order of an imaginary quadratic field. We compare the heights of our invariants by giving a general formula for the degree of the modular equation relating wN(z) and j(z). Our ultimate goal is the use of these invariants in constructing reductions of elliptic curves over finite fields suitable for cryptographic use.

KW - Class invariants

KW - Complex multiplication

KW - Eta quotients

UR - https://www.scopus.com/pages/publications/84907403621

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JO - Acta Arithmetica

JF - Acta Arithmetica

IS - 4

ER -

Generalised Weber functions

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