Circuit-based zero-knowledge proofs have arose as a solution to the implementation of privacy in blockchain applications, and to current scalability problems that blockchains suffer from. The most efficient circuit-based zero-knowledge proofs use a pairing-friendly elliptic curve to generate and validate proofs. In particular, the circuits are built connecting wires that carry elements from a large prime field, whose order is determined by the number of elements of the pairing-friendly elliptic curve. In this context, it is important to generate an inner curve using this field, because it allows to create circuits that can verify public-key cryptography primitives, such as digital signatures and encryption schemes. To this purpose, i...
As the Internet of Things (IOT) arises, the use of low-end devices on a daily basis increases. The w...
International audienceApplications of elliptic curve cryptography to anonymity, privacy and censorsh...
Koblitz ([5]) and Miller ([6]) proposed a method by which the group of points on an elliptic curve o...
Circuit-based zero-knowledge proofs have arose as a solution to the implementation of privacy in blo...
This is an open access article distributed under the terms of the Creative Commons Attribution Licen...
International audienceA zero-knowledge proof is a method by which one can prove knowledge of general...
International audienceThe elliptic curve cryptography plays a central role in various cryptographic ...
More than 25 years ago, elliptic curves over finite fields were suggested as a group in which the Di...
<div><p>Information confidentiality is an essential requirement for cyber security in critical infra...
Information confidentiality is an essential requirement for cyber security in critical infrastructur...
Elliptic curves have found widespread use in number theory and applications thereof, such as cryptog...
This thesis deals with two topics: elliptic-curve cryptography and code-based cryptography. In 2007 ...
Elliptic curves (EC) are widely studied due to their mathematical and cryptographic properties. Cryp...
We propose an approach using elliptic curve-based zero-knowledge proofs in e-commerce applications. ...
Elliptic Curve Cryptography (ECC) is a branch of public-key cryptography based on the arithmetic of ...
As the Internet of Things (IOT) arises, the use of low-end devices on a daily basis increases. The w...
International audienceApplications of elliptic curve cryptography to anonymity, privacy and censorsh...
Koblitz ([5]) and Miller ([6]) proposed a method by which the group of points on an elliptic curve o...
Circuit-based zero-knowledge proofs have arose as a solution to the implementation of privacy in blo...
This is an open access article distributed under the terms of the Creative Commons Attribution Licen...
International audienceA zero-knowledge proof is a method by which one can prove knowledge of general...
International audienceThe elliptic curve cryptography plays a central role in various cryptographic ...
More than 25 years ago, elliptic curves over finite fields were suggested as a group in which the Di...
<div><p>Information confidentiality is an essential requirement for cyber security in critical infra...
Information confidentiality is an essential requirement for cyber security in critical infrastructur...
Elliptic curves have found widespread use in number theory and applications thereof, such as cryptog...
This thesis deals with two topics: elliptic-curve cryptography and code-based cryptography. In 2007 ...
Elliptic curves (EC) are widely studied due to their mathematical and cryptographic properties. Cryp...
We propose an approach using elliptic curve-based zero-knowledge proofs in e-commerce applications. ...
Elliptic Curve Cryptography (ECC) is a branch of public-key cryptography based on the arithmetic of ...
As the Internet of Things (IOT) arises, the use of low-end devices on a daily basis increases. The w...
International audienceApplications of elliptic curve cryptography to anonymity, privacy and censorsh...
Koblitz ([5]) and Miller ([6]) proposed a method by which the group of points on an elliptic curve o...