Factorization methods, such as the quadratic sieve and the number field sieve, spend a lot of time on the sieving step, in which the necessary relations are collected for factoring the given number N. Relations are smooth or k-semismooth numbers (numbers with either all prime factors below some bound or all with the exception of at most k prime factors that do not exceed a second bound) or pairs of these type of numbers. In this thesis, we predict the amount of k-semismooth numbers needed to factor N, based on asymptotic approximation formulas (these formulas generalize the published results), and compare them with the amount of k-semismooth numbers found during the factorization of N. Furthermore, for the number field sieve we propose a me...
Prime factorization is a mathematical problem with a long history. One of the oldest known methods o...
The two currently fastest general-purpose integer factorization algorithms are the Quadratic Sieve a...
Factoring large integers has long been a subject that has interested mathematicians. And although th...
Factorization methods, such as the quadratic sieve and the number field sieve, spend a lot of time o...
The quadratic sieve and the number field sieve are two traditional factoring methods. We present her...
The Number Field Sieve (NFS) is the state-of-the art algorithm for integer factoring, and sieving is...
SummaryThe general number field sieve (GNFS) is the fastest algorithm for factoring large composite ...
The general number field sieve (GNFS) is the most efficient algorithm known for factoring large inte...
In my last paper, I described the Quadratic Sieve (QS) and it’s variants, including a very abbreviat...
It was shown in [2] that under reasonable assumptions the general number field sieve (GNFS) is the ...
abstract: This thesis project is focused on studying the number field sieve. The number field sieve ...
1.1 Prime factorization and the Number Field Sieve One of the most important and widely-studied ques...
Factoring large numbers and computing discrete logarithms are presumed to be hard problems. No polyn...
The general number field sieve (GNFS) is the fastest algorithm for factoring large composite integer...
International audienceThe general number field sieve (GNFS) is the most efficient algorithm known fo...
Prime factorization is a mathematical problem with a long history. One of the oldest known methods o...
The two currently fastest general-purpose integer factorization algorithms are the Quadratic Sieve a...
Factoring large integers has long been a subject that has interested mathematicians. And although th...
Factorization methods, such as the quadratic sieve and the number field sieve, spend a lot of time o...
The quadratic sieve and the number field sieve are two traditional factoring methods. We present her...
The Number Field Sieve (NFS) is the state-of-the art algorithm for integer factoring, and sieving is...
SummaryThe general number field sieve (GNFS) is the fastest algorithm for factoring large composite ...
The general number field sieve (GNFS) is the most efficient algorithm known for factoring large inte...
In my last paper, I described the Quadratic Sieve (QS) and it’s variants, including a very abbreviat...
It was shown in [2] that under reasonable assumptions the general number field sieve (GNFS) is the ...
abstract: This thesis project is focused on studying the number field sieve. The number field sieve ...
1.1 Prime factorization and the Number Field Sieve One of the most important and widely-studied ques...
Factoring large numbers and computing discrete logarithms are presumed to be hard problems. No polyn...
The general number field sieve (GNFS) is the fastest algorithm for factoring large composite integer...
International audienceThe general number field sieve (GNFS) is the most efficient algorithm known fo...
Prime factorization is a mathematical problem with a long history. One of the oldest known methods o...
The two currently fastest general-purpose integer factorization algorithms are the Quadratic Sieve a...
Factoring large integers has long been a subject that has interested mathematicians. And although th...