Isogeny graphs of ordinary abelian varieties

Brooks, Ernest Hunter; Jetchev, Dimitar; Wesolowski, Benjamin

doi:10.1007/s40993-017-0087-5

Cited by 11 publications

(25 citation statements)

References 35 publications

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“…Given an order O ⊆ K containing O F , the structure of C(O) can be seen through the following exact sequence Proof. This Proposition summarizes Proposition 5.4 and Lemma 5.5 of [8].…”

Section: Navigating Isogeny Graphs and Identifying Abelian Varieties supporting

confidence: 74%

“…Following Brooks, Jetchev and Wesolowski [8], we will focus on l-isogenies, defined below. Assume that A has maximal RM and write v for the ideal f + (O F [π]).…”

Section: Class Group Actionmentioning

confidence: 99%

“…The following lemma was stated without proof in the definition of l-isogeny in [8]. We record a proof here for completeness.…”

Section: Class Group Actionmentioning

confidence: 99%

“…For this, we need the following additional result about isogeny graphs. More background may be found in [8]. This theorem implies that finding the power of each l | v which divides f + (A) is equivalent to finding the level of A in the l-isogeny graph.…”

Section: Small Primesmentioning

confidence: 99%

See 3 more Smart Citations

Computing the endomorphism ring of an ordinary abelian surface over a finite field

Springer

2019

Journal of Number Theory

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We present a new algorithm for computing the endomorphism ring of an ordinary abelian surface over a finite field which is subexponential and generalizes an algorithm of Bisson and Sutherland for elliptic curves. The correctness of this algorithm only requires the heuristic assumptions required by the algorithm of Biasse and Fieker [2] which computes the class group of an order in a number field in subexponential time. Thus we avoid the multiple heuristic assumptions on isogeny graphs and polarized class groups which were previously required. The output of the algorithm is an ideal in the maximal totally real subfield of the endomorphism algebra, generalizing the elliptic curve case.

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“…Given an order O ⊆ K containing O F , the structure of C(O) can be seen through the following exact sequence Proof. This Proposition summarizes Proposition 5.4 and Lemma 5.5 of [8].…”

Section: Navigating Isogeny Graphs and Identifying Abelian Varieties supporting

confidence: 74%

“…Following Brooks, Jetchev and Wesolowski [8], we will focus on l-isogenies, defined below. Assume that A has maximal RM and write v for the ideal f + (O F [π]).…”

Section: Class Group Actionmentioning

confidence: 99%

“…The following lemma was stated without proof in the definition of l-isogeny in [8]. We record a proof here for completeness.…”

Section: Class Group Actionmentioning

confidence: 99%

Section: Small Primesmentioning

confidence: 99%

See 2 more Smart Citations

Computing the endomorphism ring of an ordinary abelian surface over a finite field

Springer

2019

Journal of Number Theory

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“…There is a case for attempting to generalise these protocols to genus 2, especially given the recent research [RSSB16] suggesting that genus 2 arithmetic can be more efficient than elliptic curve arithmetic. The protocol presented in [DKS18] should generalise to genus 2 curves with maximal real multiplication directly-given that the structure of isogeny graphs for principally polarised simple ordinary abelian surfaces with maximal real multiplication is the same as for ordinary elliptic curves defined over Fq [Mar18;BJW17]. In order to actually implement such a protocol, there has to be a method of navigating the isogeny graphs, that is, of computing all the surfaces that are µ-isogenous to a given surface.…”

Section: Walking On Isogeny Graphsmentioning

confidence: 99%

Hilbert modular polynomials

Martindale

2020

Journal of Number Theory

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We present an algorithm to compute a higher dimensional analogue of modular polynomials. This higher dimensional analogue, the 'set of Hilbert modular polynomials', concerns cyclic isogenies of principally polarised abelian varieties with maximal real multiplication by a fixed totally real number field K0. We give a proof that this algorithm is correct, and provide practical improvements and an implementation for the 2-dimensional case with K0 = Q(√ 5). We also explain applications of this algorithm to point counting, walking on isogeny graphs, and computing class polynomials.

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Breaking the Decisional Diffie–Hellman Problem for Class Group Actions Using Genus Theory: Extended Version

2022

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In this paper, we use genus theory to analyze the hardness of the decisional Diffie-Hellman problem for ideal class groups of imaginary quadratic orders acting on sets of elliptic curves through isogenies (DDH-CGA). Such actions are used in the Couveignes-Rostovtsev-Stolbunov protocol and in CSIDH. Concretely, genus theory equips every imaginary quadratic order O with a set of assigned characters χ : cl(O) → {±1}, and for each such character and every secret ideal class [a] connecting two public elliptic curves E and E = [a] E, we show how to compute χ([a]) given only E and E , i.e. without knowledge of [a]. In practice, this breaks DDH-CGA as soon as the class number is even, which is true for a density 1 subset of all imaginary quadratic orders. For instance, our attack works very efficiently for all supersingular elliptic curves over Fp with p ≡ 1 mod 4. Our method relies on computing Tate pairings and walking down isogeny volcanoes. We also show that these ideas carry over, at least partly, to abelian varieties of arbitrary dimension. This is an extended version of the paper that was presented at Crypto 2020.

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Isogeny graphs of ordinary abelian varieties

Cited by 11 publications

References 35 publications

Computing the endomorphism ring of an ordinary abelian surface over a finite field

Computing the endomorphism ring of an ordinary abelian surface over a finite field

Hilbert modular polynomials

Breaking the Decisional Diffie–Hellman Problem for Class Group Actions Using Genus Theory: Extended Version

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