A Ring-LWE-based digital signature inspired by Lindner-Peikert scheme
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Publication:2168799
DOI10.1515/jmc-2021-0013OpenAlexW4289925288MaRDI QIDQ2168799
Publication date: 26 August 2022
Published in: Journal of Mathematical Cryptology (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/jmc-2021-0013
digital signaturelattice-based cryptographyLindner-Peikert cryptosystemRing-LWE problemRing-SIS problem
Cites Work
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- Learning a parallelepiped: Cryptanalysis of GGH and NTRU signatures
- Estimate all the {LWE, NTRU} schemes!
- Post-quantum cryptography. 5th international workshop, PQCrypto 2013, Limoges, France, June 4--7, 2013. Proceedings
- Does Fiat-Shamir require a cryptographic hash function?
- Generalized compact knapsacks, cyclic lattices, and efficient one-way functions
- A Decade of Lattice Cryptography
- Lattice Signatures and Bimodal Gaussians
- Security Proofs for Signature Schemes
- Trapdoors for Lattices: Simpler, Tighter, Faster, Smaller
- Lattice Signatures without Trapdoors
- Solving the Shortest Vector Problem in 2 n Time Using Discrete Gaussian Sampling
- New Algorithms for Learning in Presence of Errors
- Better Key Sizes (and Attacks) for LWE-Based Encryption
- BKZ 2.0: Better Lattice Security Estimates
- Trapdoors for hard lattices and new cryptographic constructions
- On Ideal Lattices and Learning with Errors over Rings
- Bonsai Trees, or How to Delegate a Lattice Basis
- Lattice-based Cryptography
- Fiat-Shamir with Aborts: Applications to Lattice and Factoring-Based Signatures
- How To Prove Yourself: Practical Solutions to Identification and Signature Problems
- Practical Lattice-Based Cryptography: A Signature Scheme for Embedded Systems
- Learning a Zonotope and More: Cryptanalysis of NTRUSign Countermeasures
- On Ideal Lattices and Learning with Errors over Rings
- An Improved Compression Technique for Signatures Based on Learning with Errors
- Short Stickelberger Class Relations and Application to Ideal-SVP
- Noise-tolerant learning, the parity problem, and the statistical query model
- On lattices, learning with errors, random linear codes, and cryptography
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