The development of the number field sieve
The development of the number field sieve [electronic resource] /
edited by Arjen K. Lenstra, Hendrik W. Lenstra.
- VIII, 140 p. online resource.
- Lecture Notes in Mathematics, 1554 0075-8434 ; .
- Lecture Notes in Mathematics, 1554 .
The number field sieve: An annotated bibliography -- Factoring with cubic integers -- The number field sieve -- The lattice sieve -- Factoring integers with the number field sieve -- Computing a square root for the number field sieve -- A general number field sieve implementation.
The number field sieve is an algorithm for finding the prime factors of large integers. It depends on algebraic number theory. Proposed by John Pollard in 1988, the method was used in 1990 to factor the ninth Fermat number, a 155-digit integer. The algorithm is most suited to numbers of a special form, but there is a promising variant that applies in general. This volume contains six research papers that describe the operation of the number field sieve, from both theoretical and practical perspectives. Pollard's original manuscript is included. In addition, there is an annotated bibliography of directly related literature.
9783540478928
10.1007/BFb0091534 doi
Mathematics.
Number theory.
Combinatorics.
Applications of Mathematics.
Number Theory.
Combinatorics.
T57-57.97
519
The number field sieve: An annotated bibliography -- Factoring with cubic integers -- The number field sieve -- The lattice sieve -- Factoring integers with the number field sieve -- Computing a square root for the number field sieve -- A general number field sieve implementation.
The number field sieve is an algorithm for finding the prime factors of large integers. It depends on algebraic number theory. Proposed by John Pollard in 1988, the method was used in 1990 to factor the ninth Fermat number, a 155-digit integer. The algorithm is most suited to numbers of a special form, but there is a promising variant that applies in general. This volume contains six research papers that describe the operation of the number field sieve, from both theoretical and practical perspectives. Pollard's original manuscript is included. In addition, there is an annotated bibliography of directly related literature.
9783540478928
10.1007/BFb0091534 doi
Mathematics.
Number theory.
Combinatorics.
Applications of Mathematics.
Number Theory.
Combinatorics.
T57-57.97
519