In this article, we consider a simple representation for real numbers and propose top-down procedures to approximate various algebraic and transcendental operations with arbitrary precision. Detailed algorithms and proofs are provided to guarantee the correctness of the approximations. Moreover, we develop and apply a perturbation analysis method to show that our approximation procedures only recompute expressions when unavoidable. In the last decade, various theories have been developed and implemented to realize real computations with arbitrary precision. Proof of correctness for existing approaches typically consider basic algebraic operations, whereas detailed arguments about transcendental operations are not available. Another importan...
Many algorithms feature an iterative loop that converges to the result of interest. The numerical op...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...
AbstractIt is possible to effectively compute the forward orbit of iterated maps contrary to often h...
In this article, we consider a simple representation for real numbers and propose top-down procedure...
Naive computations with real numbers on computers may cause serious errors. In traditional numerical...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
We present an approach to verified programs for exact real number computation that is based on indu...
International audienceWe are interested in the certification of Newton's method. We use a formalizat...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
AbstractI discuss the design and performance issues arising in the efficient implementation of the s...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
AbstractThe whole point of exact arithmetic is to generate answers to numeric problems, within some ...
International audienceWe describe here a representation of computable real numbers and a set of algo...
In this article we propose a new representation for the real numbers. This representation can be con...
AbstractWe describe here a representation of computable real numbers and a set of algorithms for the...
Many algorithms feature an iterative loop that converges to the result of interest. The numerical op...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...
AbstractIt is possible to effectively compute the forward orbit of iterated maps contrary to often h...
In this article, we consider a simple representation for real numbers and propose top-down procedure...
Naive computations with real numbers on computers may cause serious errors. In traditional numerical...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
We present an approach to verified programs for exact real number computation that is based on indu...
International audienceWe are interested in the certification of Newton's method. We use a formalizat...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
AbstractI discuss the design and performance issues arising in the efficient implementation of the s...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
AbstractThe whole point of exact arithmetic is to generate answers to numeric problems, within some ...
International audienceWe describe here a representation of computable real numbers and a set of algo...
In this article we propose a new representation for the real numbers. This representation can be con...
AbstractWe describe here a representation of computable real numbers and a set of algorithms for the...
Many algorithms feature an iterative loop that converges to the result of interest. The numerical op...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...
AbstractIt is possible to effectively compute the forward orbit of iterated maps contrary to often h...