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| 格子暗号 (Lattice-Based Cryptography)× | 楕円曲線暗号× | |
|---|---|---|
| 分野 | 暗号学 | 暗号学 |
| 系統 | Machine learning | Machine learning |
| 提唱年≠ | 1996 | 1985 |
| 提唱者≠ | Miklós Ajtai | Neal Koblitz |
| 種類≠ | public-key cryptosystem based on lattice hardness | asymmetric encryption and key agreement |
| 原典≠ | Ajtai, M. (1996). Generating hard instances of the short basis problem. In Proceedings of the 28th Annual ACM Symposium on Theory of Computing, pp. 99-108. link ↗ | Miller, V. S. (1985). Use of Elliptic Curves in Cryptography. In Proceedings of the Advances in Cryptology - CRYPTO 1985, LNCS 218, pp. 417-426. DOI ↗ |
| 別名 | lattice cryptography, post-quantum lattice cryptography | ECC, elliptic curve cryptosystem |
| 関連 | 3 | 3 |
| 概要≠ | Lattice-based cryptography is a class of cryptosystems whose security is derived from the computational hardness of lattice problems, particularly the shortest vector problem (SVP) and learning with errors (LWE). First proposed by Miklós Ajtai in 1996, lattice-based approaches have gained prominence as the leading candidates for post-quantum cryptography. Unlike RSA and ECC, which are vulnerable to quantum computers, lattice problems are believed to remain hard even against quantum algorithms. | Elliptic Curve Cryptography (ECC) is a public-key cryptosystem based on the algebraic structure of elliptic curves over finite fields. Proposed independently by Neal Koblitz and Victor Miller in 1985, ECC offers equivalent security to RSA with much smaller key sizes. Modern cryptography increasingly favors ECC for its efficiency: a 256-bit ECC key provides security comparable to a 2048-bit RSA key, making it ideal for constrained environments and high-performance systems. |
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