Isogenies are the morphisms between elliptic curves and are, accordingly, a topic of interest in the subject. As such, they have been well studied, and have been used in several cryptographic applications. Vélu's formulas show how to explicitly evaluate an isogeny, given a specification of the kernel as a list of points. However, Vélu's formulas only work for elliptic curves specified by a Weierstrass equation. This paper presents formulas similar to Vélu's that can be used to evaluate isogenies on Edwards curves and Huff curves, which are normal forms of elliptic curves that provide an alternative to the traditional Weierstrass form. Our formulas are not simply compositions of Vélu's formulas with mappings to and from Weierstrass form. Our alternate derivation yields efficient formulas for isogenies with lower algebraic complexity than such compositions. In fact, these formulas have lower algebraic complexity than Vélu's formulas on Weierstrass curves.
Isogenies are the morphisms between elliptic curves and are, accordingly, a topic of interest in the subject. As such, they have been well studied, and have been used in several cryptographic applications. Vélu's formulas show how to explicitly evaluate an isogeny, given a specification of the...
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Isogenies are the morphisms between elliptic curves and are, accordingly, a topic of interest in the subject. As such, they have been well studied, and have been used in several cryptographic applications. Vélu's formulas show how to explicitly evaluate an isogeny, given a specification of the kernel as a list of points. However, Vélu's formulas only work for elliptic curves specified by a Weierstrass equation. This paper presents formulas similar to Vélu's that can be used to evaluate isogenies on Edwards curves and Huff curves, which are normal forms of elliptic curves that provide an alternative to the traditional Weierstrass form. Our formulas are not simply compositions of Vélu's formulas with mappings to and from Weierstrass form. Our alternate derivation yields efficient formulas for isogenies with lower algebraic complexity than such compositions. In fact, these formulas have lower algebraic complexity than Vélu's formulas on Weierstrass curves.
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Keywords
Elliptic curve; Edwards curve; Huff curve