A multiple polynomial general number field sieve

被引:0
|
作者
ElkenbrachtHuizing, M
机构
来源
ALGORITHMIC NUMBER THEORY | 1996年 / 1122卷
关键词
D O I
暂无
中图分类号
TP31 [计算机软件];
学科分类号
081202 ; 0835 ;
摘要
We assume that the reader is familiar with the General Number Field Sieve (GNFS). This article describes a way to use more than two polynomials. Two, three and four polynomials are compared both for classical and for a special form of lattice sieving (line sieving). We present theoretical expectations and experimental results. With our present polynomial search algorithm, using more than two polynomials speeds up classical sieving considerably but not line sieving. Line sieving for two polynomials is the fastest way of sieving we tried so far.
引用
收藏
页码:99 / 114
页数:16
相关论文
共 50 条
  • [41] Parallel Multiple Polynomial Quadratic Sieve on Multi-core Architectures
    Macariu, Georgiana
    Petcu, Dana
    NINTH INTERNATIONAL SYMPOSIUM ON SYMBOLIC AND NUMERIC ALGORITHMS FOR SCIENTIFIC COMPUTING, PROCEEDINGS, 2007, : 59 - 65
  • [42] Improvements to the general number field sieve for discrete logarithms in prime fields. A comparison with the Gaussian integer method
    Joux, A
    Lercier, R
    MATHEMATICS OF COMPUTATION, 2003, 72 (242) : 953 - 967
  • [43] AVX-512-based Parallelization of Block Sieving and Bucket Sieving for the General Number Field Sieve Method
    Pallab, Pritam
    Das, Abhijit
    SECRYPT 2021: PROCEEDINGS OF THE 18TH INTERNATIONAL CONFERENCE ON SECURITY AND CRYPTOGRAPHY, 2021, : 653 - 658
  • [44] Number of zero point for a polynomial in real field
    LIN Liang and LIU Yirong1. Guilin Institute of Technology
    2. Central South University of Technology
    Science Bulletin, 1997, (11) : 886 - 890
  • [45] Number of zero point for a polynomial in real field
    Lin, L
    Liu, YR
    CHINESE SCIENCE BULLETIN, 1997, 42 (11): : 886 - 890
  • [46] POLYNOMIAL BOUNDS FOR THE NUMBER OF AUTOMORPHISMS OF A SURFACE OF GENERAL TYPE
    CORTI, A
    ANNALES SCIENTIFIQUES DE L ECOLE NORMALE SUPERIEURE, 1991, 24 (01): : 113 - 137
  • [47] Factorization of RSA-140 using the number field sieve
    Cavallar, S
    Dodson, B
    Lenstra, A
    Leyland, P
    Lioen, W
    Montgomery, PL
    Murphy, B
    Riele, HT
    Zimmermann, P
    ADVANCES IN CRYPTOLOGY - ASIACRYPT'99, PROCEEDINGS, 1999, 1716 : 195 - 207
  • [48] Improvements to the Descent Step in the Number Field Sieve for Discrete Logarithms
    Liu, Liwei
    Xu, Maozhi
    PROCEEDINGS OF THE 2020 INTERNATIONAL CONFERENCE ON COMPUTER, INFORMATION AND TELECOMMUNICATION SYSTEMS (CITS), 2020, : 230 - 235
  • [49] An algorithm to solve the discrete logarithm problem with the number field sieve
    Commeine, An
    Semaev, Igor
    PUBLIC KEY CRYPTOGRAPHY - PKC 2006, PROCEEDINGS, 2006, 3958 : 174 - 190
  • [50] New Complexity Trade-Offs for the (Multiple) Number Field Sieve Algorithm in Non-Prime Fields
    Sarkar, Palash
    Singh, Shashank
    ADVANCES IN CRYPTOLOGY - EUROCRYPT 2016, PT I, 2016, 9665 : 429 - 458
12345