International audienceFor almost 35 years, Schönhage-Strassen's algorithm has been the fastest algorithm known for multiplying integers, with a time complexity O(n · log n · log log n) for multiplying n-bit inputs. In 2007, Fürer proved that there exists K > 1 and an algorithm performing this operation in O(n · log n · K log n). Recent work by Harvey, van der Hoeven, and Lecerf showed that this complexity estimate can be improved in order to get K = 8, and conjecturally K = 4. Using an alternative algorithm, which relies on arithmetic modulo generalized Fermat primes, we obtain conjecturally the same result K = 4 via a careful complexity analysis in the deterministic multitape Turing model
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
International audience— We consider the complexity of integer base expansions of algebraic irrationa...
We give an O(N ·logN ·2O(log∗N)) algorithm for multiplying two N-bit integers that improves the O(N ...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
Cette thèse propose des améliorations aux problèmes de la multiplication et de la factorisation d en...
International audienceSchönhage-Strassen's algorithm is one of the best known algorithms for multipl...
Let p be a prime, and let M_p(n) denote the bit complexity of multiplying two polynomials in F_p[X] ...
This thesis explores improvements to well-known algorithms for integer multiplication and factorizat...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
Fast algorithms for integer and polynomial multiplication play an important role in scientific compu...
The Strassen algorithm for multiplying $2 \times 2$ matrices requires seven multiplications and 18 ...
The Strassen algorithm for multiplying 2 x 2 matrices requires seven multiplications and 18 addition...
Multiple-precision multiplication algorithms are of fundamental interest for both theoretical and pr...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
International audience— We consider the complexity of integer base expansions of algebraic irrationa...
We give an O(N ·logN ·2O(log∗N)) algorithm for multiplying two N-bit integers that improves the O(N ...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
Cette thèse propose des améliorations aux problèmes de la multiplication et de la factorisation d en...
International audienceSchönhage-Strassen's algorithm is one of the best known algorithms for multipl...
Let p be a prime, and let M_p(n) denote the bit complexity of multiplying two polynomials in F_p[X] ...
This thesis explores improvements to well-known algorithms for integer multiplication and factorizat...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
Fast algorithms for integer and polynomial multiplication play an important role in scientific compu...
The Strassen algorithm for multiplying $2 \times 2$ matrices requires seven multiplications and 18 ...
The Strassen algorithm for multiplying 2 x 2 matrices requires seven multiplications and 18 addition...
Multiple-precision multiplication algorithms are of fundamental interest for both theoretical and pr...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
International audience— We consider the complexity of integer base expansions of algebraic irrationa...
We give an O(N ·logN ·2O(log∗N)) algorithm for multiplying two N-bit integers that improves the O(N ...