7,268 research outputs found
Root optimization of polynomials in the number field sieve
The general number field sieve (GNFS) is the most efficient algorithm known
for factoring large integers. It consists of several stages, the first one
being polynomial selection. The quality of the chosen polynomials in polynomial
selection can be modelled in terms of size and root properties. In this paper,
we describe some algorithms for selecting polynomials with very good root
properties.Comment: 16 pages, 18 reference
The complexity of class polynomial computation via floating point approximations
We analyse the complexity of computing class polynomials, that are an
important ingredient for CM constructions of elliptic curves, via complex
floating point approximations of their roots. The heart of the algorithm is the
evaluation of modular functions in several arguments. The fastest one of the
presented approaches uses a technique devised by Dupont to evaluate modular
functions by Newton iterations on an expression involving the
arithmetic-geometric mean. It runs in time for any , where
is the CM discriminant and is the degree of the class polynomial.
Another fast algorithm uses multipoint evaluation techniques known from
symbolic computation; its asymptotic complexity is worse by a factor of . Up to logarithmic factors, this running time matches the size of the
constructed polynomials. The estimate also relies on a new result concerning
the complexity of enumerating the class group of an imaginary-quadratic order
and on a rigorously proven upper bound for the height of class polynomials
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