International audienceWe present an implementation of arbitrary-precision numerical integration with rigorous error bounds in the Arb library. Rapid convergence is ensured for piecewise complex analytic integrals by use of the Petras algorithm, which combines adaptive bisection with adaptive Gaussian quadrature where error bounds are determined via complex magnitudes without evaluating derivatives. The code is general, easy to use, and efficient, often outperforming existing non-rigorous software
The authors have implemented three numerical quadrature schemes, using the new Arbitrary Precision (...
International audienceMany numerical problems require a higher computing precision than the one offe...
International audienceThe generalized Stieltjes constants $\gamma_n(v)$ are, up to a simple scaling ...
International audienceWe describe algorithms to compute elliptic functions and their relatives (Jaco...
33 pagesThe Mathemagix project aims at the development of a ''computer analysis'' system, in which n...
International audienceArb is a C library for arbitrary-precision interval arithmetic using the midpo...
AbstractWe describe methods for the numerical calculation of integrals with verified error bounds. T...
International audienceWe describe a strategy for rigorous arbitrary-precision evaluation of Legendre...
In this dissertation, we investigate new methods to obtain uniform asymptotic expansions for the num...
AbstractLet an analytic or a piecewise analytic function on a compact interval be given. We present ...
We present an efficient implementation of hypergeometric functions in arbitrary-precision interval a...
International audienceNumerical integration is an operation that is frequently available in multiple...
Interval arithmetic achieves numerical reliability for a wide range of applications, at the price of...
We give a very simple algorithm to compute the error and complementary error functions of complex ar...
This paper reviews current quadrature methods for approximate calculation of integrals within S-Plus...
The authors have implemented three numerical quadrature schemes, using the new Arbitrary Precision (...
International audienceMany numerical problems require a higher computing precision than the one offe...
International audienceThe generalized Stieltjes constants $\gamma_n(v)$ are, up to a simple scaling ...
International audienceWe describe algorithms to compute elliptic functions and their relatives (Jaco...
33 pagesThe Mathemagix project aims at the development of a ''computer analysis'' system, in which n...
International audienceArb is a C library for arbitrary-precision interval arithmetic using the midpo...
AbstractWe describe methods for the numerical calculation of integrals with verified error bounds. T...
International audienceWe describe a strategy for rigorous arbitrary-precision evaluation of Legendre...
In this dissertation, we investigate new methods to obtain uniform asymptotic expansions for the num...
AbstractLet an analytic or a piecewise analytic function on a compact interval be given. We present ...
We present an efficient implementation of hypergeometric functions in arbitrary-precision interval a...
International audienceNumerical integration is an operation that is frequently available in multiple...
Interval arithmetic achieves numerical reliability for a wide range of applications, at the price of...
We give a very simple algorithm to compute the error and complementary error functions of complex ar...
This paper reviews current quadrature methods for approximate calculation of integrals within S-Plus...
The authors have implemented three numerical quadrature schemes, using the new Arbitrary Precision (...
International audienceMany numerical problems require a higher computing precision than the one offe...
International audienceThe generalized Stieltjes constants $\gamma_n(v)$ are, up to a simple scaling ...