Your search keyword '"Kunzweiler, Sabrina"' showing total 24 results

1. Computing modular polynomials by deformation

Author

Kunzweiler, Sabrina and Robert, Damien

Subjects

Mathematics - Number Theory, 11Y16 (Primary), 11G07, 11G10, 14B12 (Secondary)

Abstract

We present an unconditional CRT algorithm to compute the modular polynomial $\Phi_\ell(X,Y)$ in quasi-linear time. The main ingredients of our algorithm are: the embedding of $\ell$-isogenies in smooth-degree isogenies in higher dimension, and the computation of $m$-th order deformations of isogenies. We provide a proof-of-concept implementation of a heuristic version of the algorithm demonstrating the practicality of our approach. Our algorithm can also be used to compute the reduction of $\Phi_{\ell}$ modulo $p$ in quasi-linear time (with respect to $\ell$) $\tilde{O}(\ell^2(\log p + \log \ell)^{\mathfrak{O}})$., Comment: accepted for presentation at the Sixteenth Algorithmic Number Theory Symposium (ANTS XVI)

Published

2024

2. Failing to hash into supersingular isogeny graphs

Author

Booher, Jeremy, Bowden, Ross, Doliskani, Javad, Fouotsa, Tako Boris, Galbraith, Steven D., Kunzweiler, Sabrina, Merz, Simon-Philipp, Petit, Christophe, Smith, Benjamin, Stange, Katherine E., Ti, Yan Bo, Vincent, Christelle, Voloch, José Felipe, Weitkämper, Charlotte, and Zobernig, Lukas

Subjects

Mathematics - Number Theory, Computer Science - Cryptography and Security, 11G05, 11T71, 14G50, 14K02, 81P94, 94A60, 68Q12

Abstract

An important open problem in supersingular isogeny-based cryptography is to produce, without a trusted authority, concrete examples of "hard supersingular curves" that is, equations for supersingular curves for which computing the endomorphism ring is as difficult as it is for random supersingular curves. A related open problem is to produce a hash function to the vertices of the supersingular $\ell$-isogeny graph which does not reveal the endomorphism ring, or a path to a curve of known endomorphism ring. Such a hash function would open up interesting cryptographic applications. In this paper, we document a number of (thus far) failed attempts to solve this problem, in the hope that we may spur further research, and shed light on the challenges and obstacles to this endeavour. The mathematical approaches contained in this article include: (i) iterative root-finding for the supersingular polynomial; (ii) gcd's of specialized modular polynomials; (iii) using division polynomials to create small systems of equations; (iv) taking random walks in the isogeny graph of abelian surfaces; and (v) using quantum random walks., Comment: 34 pages, 8 figures

Published

2022

3. Efficient Computation of -Isogenies

Author

Decru, Thomas, Kunzweiler, Sabrina, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, El Mrabet, Nadia, editor, De Feo, Luca, editor, and Duquesne, Sylvain, editor

Published

2023

4. Low Memory Attacks on Small Key CSIDH

Author

Chi-Domínguez, Jesús-Javier, Esser, Andre, Kunzweiler, Sabrina, May, Alexander, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Tibouchi, Mehdi, editor, and Wang, XiaoFeng, editor

Published

2023

5. Generic Models for Group Actions

Author

Duman, Julien, Hartmann, Dominik, Kiltz, Eike, Kunzweiler, Sabrina, Lehmann, Jonas, Riepel, Doreen, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Boldyreva, Alexandra, editor, and Kolesnikov, Vladimir, editor

Published

2023

6. A user's guide to the local arithmetic of hyperelliptic curves

Author

Best, Alex J., Betts, L. Alexander, Bisatt, Matthew, van Bommel, Raymond, Dokchitser, Vladimir, Faraggi, Omri, Kunzweiler, Sabrina, Maistret, Céline, Morgan, Adam, Muselli, Simone, and Nowell, Sarah

Subjects

Mathematics - Number Theory, 11G20 (11G10, 14D10, 14G20, 14H45, 14Q05)

Abstract

A new approach has been recently developed to study the arithmetic of hyperelliptic curves $y^2=f(x)$ over local fields of odd residue characteristic via combinatorial data associated to the roots of $f$. Since its introduction, numerous papers have used this machinery of "cluster pictures" to compute a plethora of arithmetic invariants associated to these curves. The purpose of this user's guide is to summarise and centralise all of these results in a self-contained fashion, complemented by an abundance of examples., Comment: Minor changes. To appear in the Bulletin of the London Mathematical Society

Published

2020

7. Integral differential forms for superelliptic curves

Author

Kunzweiler, Sabrina and Wewers, Stefan

Subjects

Mathematics - Algebraic Geometry, Mathematics - Number Theory, 11G20, 14G10, 11G40

Abstract

Given a superelliptic curve $Y_K : y^n = f(x)$ over a local field $K$, we describe the theoretical background and an implementation of a new algorithm for computing the $\mathcal{O}_K$-lattice of integral differential forms on $Y_K$. We build on the results of Obus and the second author, which describe arbitrary regular models of the projective line using only valuations. One novelty of our approach is that we construct an $\mathcal{O}_K$-model of $Y_K$ with only rational singularities, but which may not be regular., Comment: 33 pages

Published

2020

8. Reduction type of genus-3 curves in a special stratum of their moduli space

Author

Bouw, Irene, Coppola, Nirvana, Kılıçer, Pınar, Kunzweiler, Sabrina, García, Elisa Lorenzo, and Somoza, Anna

Subjects

Mathematics - Algebraic Geometry, Mathematics - Number Theory, 14H10, 14H50, 14H25, 11G20, 14Q05

Abstract

We study a 3-dimensional stratum $\mathcal{M}_{3,V}$ of the moduli space $\mathcal{M}_3$ of curves of genus $3$ parameterizing curves $Y$ that admit a certain action of $V= C_2\times C_2$. We determine the possible types of the stable reduction of these curves to characteristic different from $2$. We define invariants for $\mathcal{M}_{3,V}$ and characterize the occurrence of each of the reduction types in terms of them. We also calculate the $j$-invariant (resp. the Igusa invariants) of the irreducible components of positive genus of the stable reduction of $Y$ in terms of the invariants., Comment: We corrected a mistake in Table 4 and expanded the appendices

Published

2020

9. Differential Forms on Hyperelliptic Curves with Semistable Reduction

Author

Kunzweiler, Sabrina

Subjects

Mathematics - Algebraic Geometry, Mathematics - Number Theory, 11G20, 14H25 (Primary) 11G40 (Secondary)

Abstract

Let $C$ be a hyperelliptic curve over a local field $K$ with odd residue characteristic, defined by some affine Weierstrass equation $y^2=f(x)$. We assume that $C$ has semistable reduction and denote by $\mathcal{X} \rightarrow \textrm{Spec}\, \mathcal{O}_K$ its minimal regular model with relative dualizing sheaf $\omega_{\mathcal{X}/ \mathcal{O}_K}$. We show how to directly read off a basis for $H^0(\mathcal{X},\omega_{\mathcal{X}/\mathcal{O}_K})$ from the cluster picture of the roots of $f$. Furthermore we give a formula for the valuation of $\lambda$ such that $\lambda \cdot \frac{dx}{y} \land \dots \land x^{g-1}\frac{dx}{y}$ is a generator for $\det H^0(\mathcal{X},\omega_{\mathcal{X}/\mathcal{O}_K})$.

Published

2019

10. Low Memory Attacks on Small Key CSIDH

Author

Chi-Domínguez, Jesús-Javier, primary, Esser, Andre, additional, Kunzweiler, Sabrina, additional, and May, Alexander, additional

Published

2023

11. Group Action Key Encapsulation and Non-Interactive Key Exchange in the QROM

Author

Duman, Julien, Hartmann, Dominik, Kiltz, Eike, Kunzweiler, Sabrina, Lehmann, Jonas, Riepel, Doreen, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Agrawal, Shweta, editor, and Lin, Dongdai, editor

Published

2022

12. Password-Authenticated Key Exchange from Group Actions

Author

Abdalla, Michel, Eisenhofer, Thorsten, Kiltz, Eike, Kunzweiler, Sabrina, Riepel, Doreen, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Dodis, Yevgeniy, editor, and Shrimpton, Thomas, editor

Published

2022

13. Secret Keys in Genus-2 SIDH

Author

Kunzweiler, Sabrina, Ti, Yan Bo, Weitkämper, Charlotte, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, AlTawy, Riham, editor, and Hülsing, Andreas, editor

Published

2022

14. Reduction Types of Genus-3 Curves in a Special Stratum of their Moduli Space

Author

Bouw, Irene, Coppola, Nirvana, Kılıçer, Pınar, Kunzweiler, Sabrina, García, Elisa Lorenzo, Somoza, Anna, Lauter, Kristin, Series Editor, Cojocaru, Alina Carmen, editor, Ionica, Sorina, editor, and García, Elisa Lorenzo, editor

Published

2021

15. Failing to Hash Into Supersingular Isogeny Graphs

Author

Booher, Jeremy, primary, Bowden, Ross, additional, Doliskani, Javad, additional, Boris Fouotsa, Tako, additional, Galbraith, Steven D, additional, Kunzweiler, Sabrina, additional, Merz, Simon-Philipp, additional, Petit, Christophe, additional, Smith, Benjamin, additional, Stange, Katherine E, additional, Ti, Yan Bo, additional, Vincent, Christelle, additional, Voloch, José Felipe, additional, Weitkämper, Charlotte, additional, and Zobernig, Lukas, additional

Published

2024

16. Password-Authenticated Key Exchange from Group Actions

Author

Abdalla, Michel, primary, Eisenhofer, Thorsten, additional, Kiltz, Eike, additional, Kunzweiler, Sabrina, additional, and Riepel, Doreen, additional

Published

2022

17. Secret Keys in Genus-2 SIDH

Author

Kunzweiler, Sabrina, primary, Ti, Yan Bo, additional, and Weitkämper, Charlotte, additional

Published

2022

18. Group Action Key Encapsulation and Non-Interactive Key Exchange in the QROM

Author

Duman, Julien, primary, Hartmann, Dominik, additional, Kiltz, Eike, additional, Kunzweiler, Sabrina, additional, Lehmann, Jonas, additional, and Riepel, Doreen, additional

Published

2022

19. Failing to Hash Into Supersingular Isogeny Graphs

Author

Booher, Jeremy, Bowden, Ross, Doliskani, Javad, Boris Fouotsa, Tako, Galbraith, Steven D, Kunzweiler, Sabrina, Merz, Simon Philipp, Petit, Christophe, Smith, Benjamin D, Stange, Katherine K.E., Ti, Yan Bo, Vincent, Christelle, Voloch, José Felipe, Weitkämper, Charlotte, Zobernig, Lukas, Booher, Jeremy, Bowden, Ross, Doliskani, Javad, Boris Fouotsa, Tako, Galbraith, Steven D, Kunzweiler, Sabrina, Merz, Simon Philipp, Petit, Christophe, Smith, Benjamin D, Stange, Katherine K.E., Ti, Yan Bo, Vincent, Christelle, Voloch, José Felipe, Weitkämper, Charlotte, and Zobernig, Lukas

Abstract

An important open problem in supersingular isogeny-based cryptography is to produce, without a trusted authority, concrete examples of ‘hard supersingular curves’ that is equations for supersingular curves for which computing the endomorphism ring is as difficult as it is for random supersingular curves. A related open problem is to produce a hash function to the vertices of the supersingular $ell $-isogeny graph, which does not reveal the endomorphism ring, or a path to a curve of known endomorphism ring. Such a hash function would open up interesting cryptographic applications. In this paper, we document a number of (thus far) failed attempts to solve this problem, in the hope that we may spur further research, and shed light on the challenges and obstacles to this endeavour. The mathematical approaches contained in this article include: (i) iterative root-finding for the supersingular polynomial; (ii) gcd’s of specialized modular polynomials; (iii) using division polynomials to create small systems of equations; (iv) taking random walks in the isogeny graph of abelian surfaces, and applying Kummer surfaces and (v) using quantum random walks., info:eu-repo/semantics/published

Published

2024

20. Differential forms on hyperelliptic curves with semistable reduction

Author

Kunzweiler, Sabrina

Published

2020

21. Efficient Computation of $(3^n , 3^n)$-Isogenies

Author

Decru, Thomas, Kunzweiler, Sabrina, IMEC (IMEC), Catholic University of Leuven - Katholieke Universiteit Leuven (KU Leuven), Institut de Mathématiques de Bordeaux (IMB), Université Bordeaux Segalen - Bordeaux 2-Université Sciences et Technologies - Bordeaux 1 (UB)-Université de Bordeaux (UB)-Institut Polytechnique de Bordeaux (Bordeaux INP)-Centre National de la Recherche Scientifique (CNRS), Lithe and fast algorithmic number theory (LFANT), Université Bordeaux Segalen - Bordeaux 2-Université Sciences et Technologies - Bordeaux 1 (UB)-Université de Bordeaux (UB)-Institut Polytechnique de Bordeaux (Bordeaux INP)-Centre National de la Recherche Scientifique (CNRS)-Université Bordeaux Segalen - Bordeaux 2-Université Sciences et Technologies - Bordeaux 1 (UB)-Université de Bordeaux (UB)-Institut Polytechnique de Bordeaux (Bordeaux INP)-Centre National de la Recherche Scientifique (CNRS)-Inria Bordeaux - Sud-Ouest, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria), and ANR-19-CE48-0008,CIAO,Cryptographie, isogenies et variété abéliennes surpuissantes(2019)

Subjects

[INFO.INFO-CR]Computer Science [cs]/Cryptography and Security [cs.CR], Isogenies, Post-quantum Cryptography, Abelian surfaces, [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT]

Abstract

International audience; The parametrization of $(3, 3)$-isogenies by Bruin, Flynn and Testa requires over 37.500 multiplications if one wants to evaluate a single isogeny in a point. We simplify their formulae and reduce the amount of required multiplications by 94%. Further we deduce explicit formulae for evaluating $(3, 3)$-splitting and gluing maps in the framework of the parametrization by Bröker, Howe, Lauter and Stevenhagen. We provide implementations to compute $(3^n , 3^n)$-isogenies between principally polarized abelian surfaces with a focus on cryptographic application. Our implementation can retrieve Alice's secret isogeny in 11 seconds for the SIKEp751 parameters, which were aimed at NIST level 5 security.

Published

2023

22. A user's guide to the local arithmetic of hyperelliptic curves

Author

Best, Alex J., primary, Betts, L. Alexander, additional, Bisatt, Matthew, additional, van Bommel, Raymond, additional, Dokchitser, Vladimir, additional, Faraggi, Omri, additional, Kunzweiler, Sabrina, additional, Maistret, Céline, additional, Morgan, Adam, additional, Muselli, Simone, additional, and Nowell, Sarah, additional

Published

2022

23. Models of curves and integral differential forms

Author

Kunzweiler, Sabrina, Wewers, Stefan, and Sijsling, Jeroen

Subjects

Semistable reduction, MacLane valuations, Birch-Swinnerton-Dyer conjecture, Algebraische Kurve, Models of curves, Superelliptic curves, Differential forms, Curves, Algebraic, DDC 510 / Mathematics, Arithmetische Geometrie, Arithmetical algebraic geometry, ddc:510, Integral differentials

Abstract

In this thesis we study curves defined over a local field that can be represented as a tame cover of the projective line. Using the theory of MacLane valuations, we describe an algorithm for the computation of a model with at most rational singularities. In the second part, we use these results to develop an algorithm for the computation of the lattice of integral differential forms for superelliptic curves. In the case of semistable reduction, the computation of a model with rational singularities simplifies. In that setting, we describe how to read off a basis for the lattice of integral differential forms from the cluster picture of a superelliptic curve. A closer analysis in the case of hyperelliptic curves allows to formulate an explicit formula for the covolume of the lattice of integral differential forms.

Published

2021

24. Reduction Types of Genus-3 Curves in a Special Stratum of their Moduli Space

Author

Cojocaru, Alina Carmen, Ionica, Sorina, García, Elisa Lorenzo, Bouw, Irene, Coppola, Nirvana, Kılıçer, Pınar, Kunzweiler, Sabrina, Somoza, Anna, Cojocaru, Alina Carmen, Ionica, Sorina, García, Elisa Lorenzo, Bouw, Irene, Coppola, Nirvana, Kılıçer, Pınar, Kunzweiler, Sabrina, and Somoza, Anna

Abstract

We study a 3-dimensional stratum ℳ3 , V of the moduli space ℳ3 of curves of genus 3 parameterizing curves Y that admit a certain action of V = C2 × C2. We determine the possible types of the stable reduction of these curves to characteristic different from 2. We define invariants for ℳ3 , V and characterize the occurrence of each of the reduction types in terms of them. We also calculate the j-invariant (respectively the Igusa invariants) of the irreducible components of positive genus of the stable reduction Y in terms of the invariants.

Published

2021