We describe an algorithm for arbitrary-precision computation of the elementary functions (exp, log, sin, atan, etc.) which, after a cheap precomputation, gives roughly a factor-two speedup over previous state-of-the-art algorithms at precision from a few thousand bits up to millions of bits. Following an idea of Schönhage, we perform argument reduction using Diophantine combinations of logarithms of primes; our contribution is to use a large set of primes instead of a single pair, aided by a fast algorithm to solve the associated integer relation problem. We also list new, optimized Machin-like formulas for the necessary logarithm and arctangent precomputations
. An algorithm due to Bengalloun that continuously enumerates the primes is adapted to give the firs...
This paper introduces a computational scheme for calculating the exponential bw where b and w a...
AbstractThis paper is a continuation of a study of numerical software for evaluating elementary func...
We describe an algorithm for arbitrary-precision computation of the elementary functions (exp, log, ...
International audienceWe describe a new implementation of the elementary transcendental functions ex...
A new algorithm for computing the complex logarithm and exponential functions is proposed. This algo...
Let M(t) denote the time required to multiply two t-digit numbers using base b arithmetic. Meth...
In many applications of real-number computation we need to evaluate elementary functions such as exp...
Range-reduction is a key point for getting accurate elementary function routines. We introduce a new...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
A commonly used argument reduction technique in el-ementary function computations begins with two po...
Prime numbers are considered the foundation-stone in the structure of integers. Since any positive i...
International audienceFor almost 35 years, Schönhage-Strassen's algorithm has been the fastest algor...
We present an efficient and elementary algorithm for computing the number of primes up to $N$ in $\t...
We give algorithms for the computation of the d-th digit of certain transcendental numbers in variou...
. An algorithm due to Bengalloun that continuously enumerates the primes is adapted to give the firs...
This paper introduces a computational scheme for calculating the exponential bw where b and w a...
AbstractThis paper is a continuation of a study of numerical software for evaluating elementary func...
We describe an algorithm for arbitrary-precision computation of the elementary functions (exp, log, ...
International audienceWe describe a new implementation of the elementary transcendental functions ex...
A new algorithm for computing the complex logarithm and exponential functions is proposed. This algo...
Let M(t) denote the time required to multiply two t-digit numbers using base b arithmetic. Meth...
In many applications of real-number computation we need to evaluate elementary functions such as exp...
Range-reduction is a key point for getting accurate elementary function routines. We introduce a new...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
A commonly used argument reduction technique in el-ementary function computations begins with two po...
Prime numbers are considered the foundation-stone in the structure of integers. Since any positive i...
International audienceFor almost 35 years, Schönhage-Strassen's algorithm has been the fastest algor...
We present an efficient and elementary algorithm for computing the number of primes up to $N$ in $\t...
We give algorithms for the computation of the d-th digit of certain transcendental numbers in variou...
. An algorithm due to Bengalloun that continuously enumerates the primes is adapted to give the firs...
This paper introduces a computational scheme for calculating the exponential bw where b and w a...
AbstractThis paper is a continuation of a study of numerical software for evaluating elementary func...