Your search keyword '"Eriksen, Jonathan Komada"' showing total 7 results

1. Generalized class group actions on oriented elliptic curves with level structure

Author

Arpin, Sarah, Castryck, Wouter, Eriksen, Jonathan Komada, Lorenzon, Gioella, and Vercauteren, Frederik

Subjects

Mathematics - Number Theory

Abstract

We study a large family of generalized class groups of imaginary quadratic orders $O$ and prove that they act freely and (essentially) transitively on the set of primitively $O$-oriented elliptic curves over a field $k$ (assuming this set is non-empty) equipped with appropriate level structure. This extends, in several ways, a recent observation due to Galbraith, Perrin and Voloch for the ray class group. We show that this leads to a reinterpretation of the action of the class group of a suborder $O' \subseteq O$ on the set of $O'$-oriented elliptic curves, discuss several other examples, and briefly comment on the hardness of the corresponding vectorization problems., Comment: Paper accepted by the International Workshop on the Arithmetic of Finite Fields 2024. Comments welcome. 18 pages

Published

2024

2. Finding orientations of supersingular elliptic curves and quaternion orders

Author

Arpin, Sarah, Clements, James, Dartois, Pierrick, Eriksen, Jonathan Komada, Kutas, Péter, and Wesolowski, Benjamin

Published

2024

3. Finding Orientations of Supersingular Elliptic Curves and Quaternion Orders

Author

Arpin, Sarah, Clements, James, Dartois, Pierrick, Eriksen, Jonathan Komada, Kutas, Péter, and Wesolowski, Benjamin

Subjects

Mathematics - Number Theory

Abstract

Orientations of supersingular elliptic curves encode the information of an endomorphism of the curve. Computing the full endomorphism ring is a known hard problem, so one might consider how hard it is to find one such orientation. We prove that access to an oracle which tells if an elliptic curve is $\mathfrak{O}$-orientable for a fixed imaginary quadratic order $\mathfrak{O}$ provides non-trivial information towards computing an endomorphism corresponding to the $\mathfrak{O}$-orientation. We provide explicit algorithms and in-depth complexity analysis. We also consider the question in terms of quaternion algebras. We provide algorithms which compute an embedding of a fixed imaginary quadratic order into a maximal order of the quaternion algebra ramified at $p$ and $\infty$. We provide code implementations in Sagemath which is efficient for finding embeddings of imaginary quadratic orders of discriminants up to $O(p)$, even for cryptographically sized $p$.

Published

2023

4. AprèsSQI: Extra Fast Verification for SQIsign Using Extension-Field Signing

Author

Corte-Real Santos, Maria, Eriksen, Jonathan Komada, Meyer, Michael, Reijnders, Krijn, 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, Joye, Marc, editor, and Leander, Gregor, editor

Published

2024

5. Cryptographic Smooth Neighbors

Author

Bruno, Giacomo, Corte-Real Santos, Maria, Costello, Craig, Eriksen, Jonathan Komada, Meyer, Michael, Naehrig, Michael, Sterner, Bruno, Goos, Gerhard, Series Editor, Hartmanis, Juris, Founding Editor, van Leeuwen, Jan, Series Editor, Hutchison, David, Editorial Board Member, Kanade, Takeo, Editorial Board Member, Kittler, Josef, Editorial Board Member, Kleinberg, Jon M., Editorial Board Member, Kobsa, Alfred, Series Editor, Mattern, Friedemann, Editorial Board Member, Mitchell, John C., Editorial Board Member, Naor, Moni, Editorial Board Member, Nierstrasz, Oscar, Series Editor, Pandu Rangan, C., Editorial Board Member, Sudan, Madhu, Series Editor, Terzopoulos, Demetri, Editorial Board Member, Tygar, Doug, Editorial Board Member, Weikum, Gerhard, Series Editor, Vardi, Moshe Y, Series Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Guo, Jian, editor, and Steinfeld, Ron, editor

Published

2023

6. Correction to: Cryptographic Smooth Neighbors

Author

Bruno, Giacomo, Corte-Real Santos, Maria, Costello, Craig, Eriksen, Jonathan Komada, Meyer, Michael, Naehrig, Michael, Sterner, Bruno, Goos, Gerhard, Series Editor, Hartmanis, Juris, Founding Editor, van Leeuwen, Jan, Series Editor, Hutchison, David, Editorial Board Member, Kanade, Takeo, Editorial Board Member, Kittler, Josef, Editorial Board Member, Kleinberg, Jon M., Editorial Board Member, Kobsa, Alfred, Series Editor, Mattern, Friedemann, Editorial Board Member, Mitchell, John C., Editorial Board Member, Naor, Moni, Editorial Board Member, Nierstrasz, Oscar, Series Editor, Pandu Rangan, C., Editorial Board Member, Sudan, Madhu, Series Editor, Terzopoulos, Demetri, Editorial Board Member, Tygar, Doug, Editorial Board Member, Weikum, Gerhard, Series Editor, Vardi, Moshe Y, Series Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Guo, Jian, editor, and Steinfeld, Ron, editor

Published

2023

7. Applying Twisted Hessian Curves to Supersingular Isogeny Diffie-Hellman

Author

Eriksen, Jonathan Komada, De Kock, Bor, and Boyd, Colin

Abstract

Sikkerheten til nesten all offentlig nøkkelkryptografi er basert på vanskeligheten til et av to matematiske problemer. Selvom disse problemene virker vanskelige på klassiske datamskiner, eksisterer det en algoritme for å løse begge disse problemene, som kun kjører på kvantemaskiner. Resultatet av dette er at dersom det noen gang bygges en kvantemaskin som er stor nok til å kjøre denne algoritmen, vil sikkerheten til digital kommunikasjon, slik som på internett, være ansett som kompromittert. På grunn av dette, utvikles det nå ny offentlig nøkkelkryptografi, som er basert på vanskeligheten av andre matematiske problemer. Et eksempel på et slikt system er Supersingulær Isogeni Diffie-Hellman (SIDH), som baserer seg på vanskelige problemer fra teori om elliptiske kurver. Disse problemene er relatert til isogenier, som er spesielle, struktur-bevarende avbildninger mellom elliptiske kurver. I denne oppgaven utforsker vi en ny måte å instansiere SIDH på, ved å bruke vridde Hessianske kurver. En vridd Hessiansk kurve er en elliptisk kurve modell, som har relativt raske formler for punkt dobling og tripling. Videre er formler for isogenier mellom slike kurver nylig blitt studert. Vi benytter disse formlene i en implementasjon av SIDH. I tillegg diskuterer vi noen strukturelle egenskaper ved vridde Hessianske kurver, og deres relasjon til SIDH. Disse egenskapene kan gi opphav til en alternativ måte å instansiere SIDH på, hvor kravene til primtallet p er betydelig redusert. Dette gir muligheten til å benytte mye mindre kropper, uten tap av sikker, som igjen resulterer i nøkler som er rundt halvparten så store som de som brukes i SIDH idag. Most public-key cryptography relies on the hardness of one of two mathematical problems. While these problems seem intractable on classical computers, there exists an algorithm for solving both of these problems, which runs on a quantum computer. The result of this is that if a quantum computer large enough to run this algorithm is ever built, it would severely compromise the security of real-world digital communications, such as on the internet. Because of this, new public-key cryptographic standards are currently being developed, which necessarily rely on the hardness of other problems. One example of such a scheme is the Supersingular Isogeny Diffie-Hellman (SIDH) key exchange, which relies on hard problems from the theory of elliptic curves. The hard problems are related to isogenies, which are special, structure-preserving maps between elliptic curves. In this thesis, we investigate a new way of instantiating the SIDH key-exchange, by using twisted Hessian curves. A twisted Hessian curve is a specific elliptic curve model, which has relatively fast formulae for point doubling and point tripling. Further, direct formulae for isogenies between these curves have recently been studied. We use these formulae to implement the SIDH key exchange. Additionally, we discuss some of the structural properties of twisted Hessian curves, in relation to SIDH. These properties may suggest an alternative way of instantiating the SIDH key exchange, where the requirements for the prime p are significantly relaxed. This gives the possibility of using much smaller field sizes at no loss in security, resulting in key sizes that are about half the size of those used in SIDH today.

Published

2021